googlelinked mathematics subject headings

[This page is a work in progress, started 25 June 2004. I'm still figuring out how to automate the creation of this page in the best way, but the great thing is that Google will keep it up to date for me when I'm done!]

Googlelinked Mathematics Subject Headings

All links dereference through Google's "I'm feeling Lucky."

Here's an explanation of what I'm trying to do here.

00–XX GENERAL
00–01 Instructional exposition (textbooks, tutorial papers, etc.)
00–02 Research exposition ( monographs survey articles )
00Axx General and miscellaneous specific topics
00A05 General mathematics
00A06 Mathematics for nonmathematicians (engineering, social sciences, etc.)
00A07 Problem books
00A08 Recreational mathematics [See also 97A20]
00A15 Bibliographies
00A17 External book reviews
00A20 Dictionariesand other general reference works
00A22 Formularies
00A30 Philosophy of mathematics [See also 03A05]
00A35 Methodology of mathematics, didactics [See also 97Cxx, 97Dxx]
00A69 General applied mathematics
00A71 Theory of mathematical modeling
00A72 General methods of simulation
00A73 Dimensional analysis
00A79 Physics (use more specific entries from Sections 70-86)
00A99 Miscellaneous topics
00Bxx Conference proceedings and collections of papers
00B05 Collections of abstracts of lectures
00B10 Collections of articles of general interest
00B15 Collections of articles of miscellaneous specific content
00B20 Proceedings of conferences of general interest
00B25 Proceedings of conferences of miscellaneous specific interest
00B30 Festschriften
00B50 Volumes of selected translations
00B55 Miscellaneous volumes of translations
00B60 Collections of reprinted articles [See also 01A75]

01–XX HISTORY AND BIOGRAPHY [See also the –03 in the other sections]
01–00 General reference works (handbooks, dictionaries, bibliographies, etc.)
01–01 Instructional exposition (textbooks, tutorial papers, etc.)
01–02 Research exposition (monographs, survey articles)
01–06 Proceedings, conferences, collections, etc.
01–08 Computational methods
01Axx History of mathematics and mathematicians
01A05 General histories, source books
01A07 Ethnomathematics, general
01A10 Paleolithic, Neolithic
01A12 Indigenous cultures of the Americas
01A13 Other indigenous cultures (non-European)
01A15 Indigenous European cultures (pre-Greek, etc.)
01A16 Egyptian
01A17 Babylonian
01A20 Greek, Roman
01A25 China
01A27 Japan
01A29 Southeast Asia
01A30 Islam (Medieval)
01A32 India
01A35 Medieval
01A40 15th and 16th centuries, Renaissance
01A45 17th century
01A50 18th century
01A55 19th century
01A60 20th century
01A61 Twenty-first century
01A65 Contemporary
01A67 Future prospectives
01A70 Biographies, obituaries, personalia, bibliographies
01A72 Schools of mathematics
01A73 Universities
01A74 Other institutions and academies
01A75 Collected or selected works; reprintings or translations of classics [See also 00B60]
01A80 Sociology (and profession) of mathematics
01A85 Historiography
01A90 Bibliographic studies
01A99 Miscellaneous topics

03–XX MATHEMATICAL LOGIC AND FOUNDATIONS
03–00 General reference works ( handbooks, dictionaries, bibliographies, etc)
03–01 Instructional exposition (textbooks, tutorial papers, etc.)
03–02 Research exposition (monographs, survey articles)
03–03 Historical (must also be assigned at least one classification number from Section 01)
03–04 Explicit machine computation and programs (not the theory of computation or programming)
03–06 Proceedings, conferences, collections, etc.
03A05 Philosophical and critical {For philosophy of mathematics, see also 00A30}
03Bxx General logic
03B05 Classical propositional logic
03B10 Classical first-order logic
03B15 Higher-order logic and type theory
03B20 Subsystems of classical logic (including intuitionistic logic)
03B22 Abstract deductive systems
03B25 Decidability of theories and sets of sentences [See also 11U05, 12L05, 20F10]
03B30 Foundations of classical theories (including reverse mathematics ) [See also 03F35]
03B35 Mechanization of proofs and logical operations [See also 68T15]
03B40 Combinatory logic and lambda-calculus [See also 68N18]
03B42 Logic of knowledge and belief
03B44 Temporal logic
03B45 Modal logic {For knowledge and belief see 03B42; for temporal logic see 03B44; for provability logic see also 03F45}
03B47 Substructural logics (including relevance, entailment, linear logic, Lambek calculus, BCK and BCI logics) [For proof-theoretic aspects see 03F52]
03B48 Probability and inductive logic [See also 60A05]
03B50 Many-valued logic
03B52 Fuzzy logic; logic of vagueness [See also 68T27, 68T37, 94D05]
03B53 Logics admitting inconsistency (paraconsistent logics, discussive logics, etc.)
03B55 Intermediate logics
03B60 Other nonclassical logic
03B65 Logic of natural languages [See also 68T50, 91F20]
03B70 Logic in computer science [See also 68–XX]
03B80 Other applications of logic
03B99 None of the above, but in this section
03Cxx Model theory
03C05 Equational classes, universal algebra [See also 08Axx, 08Bxx, 18C05]
03C07 Basic properties of first-order languages and structures
03C10 Quantifier elimination, model completeness and related topics
03C13 Finite structures [See also 68Q15, 68Q19]
03C15 Denumerable structures
03C20 Ultraproducts and related constructions
03C25 Model-theoretic forcing
03C30 Other model constructions
03C35 Categoricity and completeness of theories
03C40 Interpolation, preservation, definability
03C45 Classification theory, stability and related concepts
03C50 Models with special properties (saturated, rigid, etc.)
03C52 Properties of classes of models
03C55 Set-theoretic model theory
03C57 Effective and recursion-theoretic model theory [See also 03D45]
03C60 Model-theoretic algebra [See also 08C10, 12Lxx, 13L05]
03C62 Models of arithmetic and set theory [See also 03Hxx]
03C64 Model theory of ordered structures; o-minimality
03C65 Models of other mathematical theories
03C68 Other classical first-order model theory
03C70 Logic on admissible sets
03C75 Other infinitary logic
03C80 Logic with extra quantifiers and operators [See also 03B42, 03B44, 03B45, 03B48]
03C85 Second- and higher-order model theory

****TEMPORARY MARKER---UNFINISHED BELOW THIS POINT****

03C90 Nonclassical models (Boolean-valued, sheaf, etc.)
03C95 Abstract model theory
03C98 Applications of model theory [See also 03C60]
03C99 None of the above, but in this section
03Dxx Computability and recursion theory
03D03 Thue and Post systems, etc.
03D05 Automata and formal grammars in connection with logical questions [See also 68Q45, 68Q70, 68R15]
03D10 Turing machines and related notions [See also 68Q05]
03D15 Complexity of computation [See also 68Q15, 68Q17]
03D20 Recursive functions and relations, subrecursive hierarchies
03D25 Recursively (computably) enumerable sets and degrees
03D28 Other Turing degree structures
03D30 Other degrees and reducibilities
03D35 Undecidability and degrees of sets of sentences
03D40 Word problems, etc. [See also 06B25, 08A50, 20F10, 68R15]
03D45 Theory of numerations, effectively presented structures [See also 03C57; for intuitionistic and similar approaches see 03F55]
03D50 Recursive equivalence types of sets and structures, isols
03D55 Hierarchies
03D60 Computability and recursion theory on ordinals, admissible sets, etc.
03D65 Higher-type and set recursion theory
03D70 Inductive definability
03D75 Abstract and axiomatic computability and recursion theory
03D80 Applications of computability and recursion theory
03D99 None of the above, but in this section
03Exx Set theory
03E02 Partition relations
03E04 Ordered sets and their cofinalities; pcf theory
03E05 Other combinatorial set theory
03E10 Ordinal and cardinal numbers
03E15 Descriptive set theory [See also 28A05, 54H05]
03E17 Cardinal characteristics of the continuum
03E20 Other classical set theory (including functions,
relations, and set algebra)
03E25 Axiom of choice and related propositions
03E30 Axiomatics of classical set theory and its
fragments
03E35 Consistency and independence results
03E40 Other aspects of forcing and Boolean-valued
models
03E45 Inner models, including constructibility, ordinal
definability, and core models
03E47 Other notions of set-theoretic definability
03E50 Continuum hypothesis and Martin’s axiom
03E55 Large cardinals
03E60 Determinacy principles
03E65 Other hypotheses and axioms
03E70 Nonclassical and second-order set theories
03E72 Fuzzy set theory
03E75 Applications of set theory
03E99 None of the above, but in this section
03Fxx Proof theory and constructive mathematics
03F03 Proof theory, general
03F05 Cut-elimination and normal-form theorems
03F07 Structure of proofs
03F10 Functionals in proof theory
03F15 Recursive ordinals and ordinal notations
03F20 Complexity of proofs
03F25 Relative consistency and interpretations
03F30 First-order arithmetic and fragments
03F35 Second- and higher-order arithmetic and
fragments [See also 03B30]
03F40 G¨odel numberings in proof theory
03F45 Provability logics and related algebras (e.g.,
diagonalizable algebras) [See also 03B45, 03G25,
06E25]
03F50 Metamathematics of constructive systems
03F52 Linear logic and other substructural logics
[See also 03B47]
03F55 Intuitionistic mathematics
03F60 Constructive and recursive analysis
[See also 03B30, 03D45, 26E40, 46S30, 47S30]
03F65 Other constructive mathematics [See also 03D45]
03F99 None of the above, but in this section
03Gxx Algebraic logic
03G05 Boolean algebras [See also 06Exx]
03G10 Lattices and related structures [See also 06Bxx]
MATHEMATICS SUBJECT CLASSIFICATION 2000 03Gxx 4
03G12 Quantum logic [See also 06C15, 81P10]
03G15 Cylindric and polyadic algebras; relation algebras
03G20 £ukasiewicz and Post algebras [See also 06D25,
06D30]
03G25 Other algebras related to logic [See also 03F45,
06D20, 06E25, 06F35]
03G30 Categorical logic, topoi [See also 18B25, 18C05,
18C10]
03G99 None of the above, but in this section
03Hxx Nonstandard models [See also 03C62]
03H05 Nonstandard models in mathematics
[See also 26E35, 28E05, 30G06, 46S20, 47S20,
54J05]
03H10 Other applications of nonstandard models
(economics, physics, etc.)
03H15 Nonstandard models of arithmetic
[See also 11U10, 12L15, 13L05]
03H99 None of the above, but in this section
05–XX COMBINATORICS {For finite fields, see
11Txx} 05–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
05–01 Instructional exposition (textbooks, tutorial
papers, etc.)
05–02 Research exposition (monographs, survey articles)
05–03 Historical (must also be assigned at least one
classification number from Section 01)
05–04 Explicit machine computation and programs (not
the theory of computation or programming)
05–06 Proceedings, conferences, collections, etc.
05Axx Enumerative combinatorics
05A05 Combinatorial choice problems (subsets,
representatives, permutations)
05A10 Factorials, binomial coefficients, combinatorial
functions [See also 11B65, 33Cxx]
05A15 Exact enumeration problems, generating functions
[See also 33Cxx, 33Dxx]
05A16 Asymptotic enumeration
05A17 Partitions of integers [See also 11P81, 11P82,
11P83]
05A18 Partitions of sets
05A19 Combinatorial identities
05A20 Combinatorial inequalities
05A30 q-calculus and related topics [See also 03Dxx]
05A40 Umbral calculus
05A99 None of the above, but in this section
05Bxx Designs and configurations {For applications
of design theory, see 94C30} 05B05 Block designs [See also 51E05, 62K10]
05B07 Triple systems
05B10 Difference sets (number-theoretic, grouptheoretic,
etc.) [See also 11B13]
05B15 Orthogonal arrays, Latin squares, Room squares
05B20 Matrices (incidence, Hadamard, etc.)
05B25 Finite geometries [See also 51D20, 51Exx]
05B30 Other designs, configurations [See also 51E30]
05B35 Matroids, geometric lattices [See also 52B40,
90C27]
05B40 Packing and covering [See also 11H31, 52C15,
52C17]
05B45 Tessellation and tiling problems [See also 52C20,
52C22]
05B50 Polyominoes
05B99 None of the above, but in this section
05Cxx Graph theory {For applications of graphs, see
68R10, 90C35, 94C15} 05C05 Trees
05C07 Degree sequences
05C10 Topological graph theory, imbedding
[See also 57M15, 57M25]
05C12 Distance in graphs
05C15 Coloring of graphs and hypergraphs
05C17 Perfect graphs
05C20 Directed graphs (digraphs), tournaments
05C22 Signed, gain and biased graphs
05C25 Graphs and groups [See also 20F65]
05C30 Enumeration of graphs and maps
05C35 Extremal problems [See also 90C35]
05C38 Paths and cycles [See also 90B10]
05C40 Connectivity
05C45 Eulerian and Hamiltonian graphs
05C50 Graphs and matrices
05C55 Generalized Ramsey theory
05C60 Isomorphism problems (reconstruction conjecture,
etc.)
05C62 Graph representations (geometric and intersection
representations, etc.)
05C65 Hypergraphs
05C69 Dominating sets, independent sets, cliques
05C70 Factorization, matching, covering and packing
05C75 Structural characterization of types of graphs
05C78 Graph labelling (graceful graphs, bandwidth, etc.)
05C80 Random graphs
05C83 Graph minors
05C85 Graph algorithms [See also 68R10, 68W05]
05C90 Applications
05C99 None of the above, but in this section
05Dxx Extremal combinatorics
05D05 Extremal set theory
05D10 Ramsey theory
05D15 Transversal (matching) theory
05D40 Probabilistic methods
05D99 None of the above, but in this section
05Exx Algebraic combinatorics
05E05 Symmetric functions
05E10 Tableaux, representations of the symmetric group
[See also 20C30]
05E15 Combinatorial problems concerning the classical
groups [See also 22E45, 33C80]
05E20 Group actions on designs, geometries and codes
05E25 Group actions on posets and homology groups of
posets [See also 06A11]
05E30 Association schemes, strongly regular graphs

05E35 Orthogonal polynomials [See also 33C45, 33C50,
33D45]
05E99 None of the above, but in this section
06–XX ORDER, LATTICES, ORDERED
ALGEBRAIC STRUCTURES [See also 18B35]
06–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
06–01 Instructional exposition (textbooks, tutorial
papers, etc.)
06–02 Research exposition (monographs, survey articles)
06–03 Historical (must also be assigned at least one
classification number from Section 01)
06–04 Explicit machine computation and programs (not
the theory of computation or programming)
06–06 Proceedings, conferences, collections, etc.
06Axx Ordered sets
06A05 Total order
06A06 Partial order, general
06A07 Combinatorics of partially ordered sets
06A11 Algebraic aspects of posets [See also 05E25]
06A12 Semilattices [See also 20M10; for topological
semilattices see 22A26]
06A15 Galois correspondences, closure operators
06A99 None of the above, but in this section
06Bxx Lattices [See also 03G10]
06B05 Structure theory
06B10 Ideals, congruence relations
06B15 Representation theory
06B20 Varieties of lattices
06B23 Complete lattices, completions
06B25 Free lattices, projective lattices, word problems
[See also 03D40, 08A50, 20F10]
06B30 Topological lattices, order topologies
[See also 06F30, 22A26, 54F05, 54H12]
06B35 Continuous lattices and posets, applications
[See also 06B30, 06D10, 06F30, 18B35, 22A26,
68Q55]
06B99 None of the above, but in this section
06Cxx Modular lattices, complemented lattices
06C05 Modular lattices, Desarguesian lattices
06C10 Semimodular lattices, geometric lattices
06C15 Complemented lattices, orthocomplemented
lattices and posets [See also 03G12, 81P10]
06C20 Complemented modular lattices, continuous
geometries
06C99 None of the above, but in this section
06Dxx Distributive lattices
06D05 Structure and representation theory
06D10 Complete distributivity
06D15 Pseudocomplemented lattices
06D20 Heyting algebras [See also 03G25]
06D22 Frames, locales {For topological questions see
54–XX} 06D25 Post algebras [See also 03G20]
06D30 De Morgan algebras, £ukasiewicz algebras
[See also 03G20]
06D35 MV-algebras
06D50 Lattices and duality
06D72 Fuzzy lattices (soft algebras) and related topics
06D99 None of the above, but in this section
06Exx Boolean algebras (Boolean rings)
[See also 03G05]
06E05 Structure theory
06E10 Chain conditions, complete algebras
06E15 Stone space and related constructions
06E20 Ring-theoretic properties [See also 16E50,
16G30]
06E25 Boolean algebras with additional operations
(diagonalizable algebras, etc.) [See also 03G25,
03F45]
06E30 Boolean functions [See also 94C10]
06E99 None of the above, but in this section
06Fxx Ordered structures
06F05 Ordered semigroups and monoids
[See also 20Mxx]
06F07 Quantales
06F10 Noether lattices
06F15 Ordered groups [See also 20F60]
06F20 Ordered abelian groups, Riesz groups, ordered
linear spaces [See also 46A40]
06F25 Ordered rings, algebras, modules {For ordered
fields, see 12J15; see also 13J25, 16W80} 06F30 Topological lattices, order topologies
[See also 06B30, 22A26, 54F05, 54H12]
06F35 BCK-algebras, BCI-algebras [See also 03G25]
06F99 None of the above, but in this section
08–XX GENERAL ALGEBRAIC SYSTEMS
08–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
08–01 Instructional exposition (textbooks, tutorial
papers, etc.)
08–02 Research exposition (monographs, survey articles)
08–03 Historical (must also be assigned at least one
classification number from Section 01)
08–04 Explicit machine computation and programs (not
the theory of computation or programming)
08–06 Proceedings, conferences, collections, etc.
08Axx Algebraic structures [See also 03C05]
08A02 Relational systems, laws of composition
08A05 Structure theory
08A30 Subalgebras, congruence relations
08A35 Automorphisms, endomorphisms
08A40 Operations, polynomials, primal algebras
08A45 Equational compactness
08A50 Word problems [See also 03D40, 06B25, 20F10,
68R15]
08A55 Partial algebras
08A60 Unary algebras
08A62 Finitary algebras
08A65 Infinitary algebras
08A68 Heterogeneous algebras
08A70 Applications of universal algebra in computer
science
08A72 Fuzzy algebraic structures
MATHEMATICS SUBJECT CLASSIFICATION 2000 08Axx 6
08A99 None of the above, but in this section
08Bxx Varieties [See also 03C05]
08B05 Equational logic, Mal0cev (Mal0tsev) conditions
08B10 Congruence modularity, congruence distributivity
08B15 Lattices of varieties
08B20 Free algebras
08B25 Products, amalgamated products, and other kinds
of limits and colimits [See also 18A30]
08B26 Subdirect products and subdirect irreducibility
08B30 Injectives, projectives
08B99 None of the above, but in this section
08Cxx Other classes of algebras
08C05 Categories of algebras [See also 18C05]
08C10 Axiomatic model classes [See also 03Cxx, in
particular 03C60]
08C15 Quasivarieties
08C99 None of the above, but in this section
11–XX NUMBER THEORY
11–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
11–01 Instructional exposition (textbooks, tutorial
papers, etc.)
11–02 Research exposition (monographs, survey articles)
11–03 Historical (must also be assigned at least one
classification number from Section 01)
11–04 Explicit machine computation and programs (not
the theory of computation or programming)
11–06 Proceedings, conferences, collections, etc.
11Axx Elementary number theory {For analogues in
number fields, see 11R04} 11A05 Multiplicative structure; Euclidean algorithm;
greatest common divisors
11A07 Congruences; primitive roots; residue systems
11A15 Power residues, reciprocity
11A25 Arithmetic functions; related numbers; inversion
formulas
11A41 Primes
11A51 Factorization; primality
11A55 Continued fractions {For approximation results,
see 11J70} [See also 11K50, 30B70, 40A15]
11A63 Radix representation; digital problems {For
metric results, see 11K16} 11A67 Other representations
11A99 None of the above, but in this section
11Bxx Sequences and sets
11B05 Density, gaps, topology
11B13 Additive bases [See also 05B10]
11B25 Arithmetic progressions [See also 11N13]
11B34 Representation functions
11B37 Recurrences {For applications to special
functions, see 33–XX} 11B39 Fibonacci and Lucas numbers and polynomials
and generalizations
11B50 Sequences (mod m)
11B57 Farey sequences; the sequences 1k, 2k, · · · 11B65 Binomial coefficients; factorials; q-identities
[See also 05A10, 05A30]
11B68 Bernoulli and Euler numbers and polynomials
11B73 Bell and Stirling numbers
11B75 Other combinatorial number theory
11B83 Special sequences and polynomials
11B85 Automata sequences
11B99 None of the above, but in this section
11Cxx Polynomials and matrices
11C08 Polynomials [See also 13F20]
11C20 Matrices, determinants [See also 15A36]
11C99 None of the above, but in this section
11Dxx Diophantine equations [See also 11Gxx,
14Gxx]
11D04 Linear equations
11D09 Quadratic and bilinear equations
11D25 Cubic and quartic equations
11D41 Higher degree equations; Fermat’s equation
11D45 Counting solutions of Diophantine equations
11D57 Multiplicative and norm form equations
11D59 Thue-Mahler equations
11D61 Exponential equations
11D68 Rational numbers as sums of fractions
11D72 Equations in many variables [See also 11P55]
11D75 Diophantine inequalities [See also 11J25]
11D79 Congruences in many variables
11D85 Representation problems [See also 11P55]
11D88 p-adic and power series fields
11D99 None of the above, but in this section
11Exx Forms and linear algebraic groups
[See also 19Gxx] {For quadratic forms in
linear algebra, see 15A63} 11E04 Quadratic forms over general fields
11E08 Quadratic forms over local rings and fields
11E10 Forms over real fields
11E12 Quadratic forms over global rings and fields
11E16 General binary quadratic forms
11E20 General ternary and quaternary quadratic forms;
forms of more than two variables
11E25 Sums of squares and representations by other
particular quadratic forms
11E39 Bilinear and Hermitian forms
11E41 Class numbers of quadratic and Hermitian forms
11E45 Analytic theory (Epstein zeta functions; relations
with automorphic forms and functions)
11E57 Classical groups [See also 14Lxx, 20Gxx]
11E70 K-theory of quadratic and Hermitian forms
11E72 Galois cohomology of linear algebraic groups
[See also 20G10]
11E76 Forms of degree higher than two
11E81 Algebraic theory of quadratic forms; Witt groups
and rings [See also 19G12, 19G24]
11E88 Quadratic spaces; Clifford algebras
[See also 15A63, 15A66]
11E95 p-adic theory
11E99 None of the above, but in this section
MATHEMATICS SUBJECT CLASSIFICATION 2000 7 11Jxx
11Fxx Discontinuous groups and automorphic forms
[See also 11R39, 11S37, 14Gxx, 14Kxx, 22E50,
22E55, 30F35, 32Nxx] {For relations with
quadratic forms, see 11E45} 11F03 Modular and automorphic functions
11F06 Structure of modular groups and generalizations;
arithmetic groups [See also 20H05, 20H10,
22E40]
11F11 Modular forms, one variable
11F12 Automorphic forms, one variable
11F20 Dedekind eta function, Dedekind sums
11F22 Relationship to Lie algebras and finite simple
groups
11F23 Relations with algebraic geometry and topology
11F25 Hecke-Petersson operators, differential operators
(one variable)
11F27 Theta series; Weil representation
11F30 Fourier coefficients of automorphic forms
11F32 Modular correspondences, etc.
11F33 Congruences for modular and p-adic modular
forms [See also 14G20, 22E50]
11F37 Forms of half-integer weight; nonholomorphic
modular forms
11F41 Hilbert and Hilbert-Siegel modular groups and
their modular and automorphic forms; Hilbert
modular surfaces [See also 14J20]
11F46 Siegel modular groups and their modular and
automorphic forms
11F50 Jacobi forms
11F52 Modular forms associated to Drinfel0d modules
11F55 Other groups and their modular and automorphic
forms (several variables)
11F60 Hecke-Petersson operators, differential operators
(several variables)
11F66 Dirichlet series and functional equations in
connection with modular forms
11F67 Special values of automorphic L-series, periods
of modular forms, cohomology, modular symbols
11F70 Representation-theoretic methods; automorphic
representations over local and global fields
11F72 Spectral theory; Selberg trace formula
11F75 Cohomology of arithmetic groups
11F80 Galois representations
11F85 p-adic theory, local fields [See also 14G20,
22E50]
11F99 None of the above, but in this section
11Gxx Arithmetic algebraic geometry (Diophantine
geometry) [See also 11Dxx, 14Gxx, 14Kxx]
11G05 Elliptic curves over global fields
[See also 14H52]
11G07 Elliptic curves over local fields [See also 14G20,
14H52]
11G09 Drinfel0d modules; higher-dimensional motives,
etc. [See also 14L05]
11G10 Abelian varieties of dimension > 1
[See also 14Kxx]
11G15 Complex multiplication and moduli of abelian
varieties [See also 14K22]
11G16 Elliptic and modular units [See also 11R27]
11G18 Arithmetic aspects of modular and Shimura
varieties [See also 14G35]
11G20 Curves over finite and local fields
[See also 14H25]
11G25 Varieties over finite and local fields
[See also 14G15, 14G20]
11G30 Curves of arbitrary genus or genus 6= 1 over
global fields [See also 14H25]
11G35 Varieties over global fields [See also 14G25]
11G40 L-functions of varieties over global fields; Birch-
Swinnerton-Dyer conjecture [See also 14G10]
11G45 Geometric class field theory [See also 11R37,
14C35, 19F05]
11G50 Heights [See also 14G40]
11G55 Polylogarithms and relations with K-theory
11G99 None of the above, but in this section
11Hxx Geometry of numbers {For applications in
coding theory, see 94B75} 11H06 Lattices and convex bodies [See also 11P21,
52C05, 52C07]
11H16 Nonconvex bodies
11H31 Lattice packing and covering [See also 05B40,
52C15, 52C17]
11H46 Products of linear forms
11H50 Minima of forms
11H55 Quadratic forms (reduction theory, extreme forms,
etc.)
11H56 Automorphism groups of lattices
11H60 Mean value and transfer theorems
11H71 Relations with coding theory
11H99 None of the above, but in this section
11Jxx Diophantine approximation, transcendental
number theory [See also 11K60]
11J04 Homogeneous approximation to one number
11J06 Markov and Lagrange spectra and generalizations
11J13 Simultaneous homogeneous approximation, linear
forms
11J17 Approximation by numbers from a fixed field
11J20 Inhomogeneous linear forms
11J25 Diophantine inequalities [See also 11D75]
11J54 Small fractional parts of polynomials and
generalizations
11J61 Approximation in non-Archimedean valuations
11J68 Approximation to algebraic numbers
11J70 Continued fractions and generalizations
[See also 11A55, 11K50]
11J71 Distribution modulo one [See also 11K06]
11J72 Irrationality; linear independence over a field
11J81 Transcendence (general theory)
11J82 Measures of irrationality and of transcendence
11J83 Metric theory
11J85 Algebraic independence; Gel0fond’s method
11J86 Linear forms in logarithms; Baker’s method
11J89 Transcendence theory of elliptic and abelian
functions
11J91 Transcendence theory of other special functions
11J93 Transcendence theory of Drinfel0d and t-modules
MATHEMATICS SUBJECT CLASSIFICATION 2000 11Jxx 8
11J95 Results involving abelian varieties
11J97 Analogues of methods in Nevanlinna theory
(work of Vojta et al.)
11J99 None of the above, but in this section
11Kxx Probabilistic theory: distribution modulo 1;
metric theory of algorithms
11K06 General theory of distribution modulo 1
[See also 11J71]
11K16 Normal numbers, radix expansions, etc.
[See also 11A63]
11K31 Special sequences
11K36 Well-distributed sequences and other variations
11K38 Irregularities of distribution, discrepancy
[See also 11Nxx]
11K41 Continuous, p-adic and abstract analogues
11K45 Pseudo-random numbers; Monte Carlo methods
11K50 Metric theory of continued fractions
[See also 11A55, 11J70]
11K55 Metric theory of other algorithms and
expansions; measure and Hausdorff dimension
[See also 11N99, 28Dxx]
11K60 Diophantine approximation [See also 11Jxx]
11K65 Arithmetic functions [See also 11Nxx]
11K70 Harmonic analysis and almost periodicity
11K99 None of the above, but in this section
11Lxx Exponential sums and character sums {For
finite fields, see 11Txx} 11L03 Trigonometric and exponential sums, general
11L05 Gauss and Kloosterman sums; generalizations
11L07 Estimates on exponential sums
11L10 Jacobsthal and Brewer sums; other complete
character sums
11L15 Weyl sums
11L20 Sums over primes
11L26 Sums over arbitrary intervals
11L40 Estimates on character sums
11L99 None of the above, but in this section
11Mxx Zeta and L-functions: analytic theory
11M06 (s) and L(s, )
11M20 Real zeros of L(s, ); results on L(1, )
11M26 Nonreal zeros of (s) and L(s, ); Riemann and
other hypotheses
11M35 Hurwitz and Lerch zeta functions
11M36 Selberg zeta functions and regularized
determinants; applications to spectral theory,
Dirichlet series, Eisenstein series, etc. Explicit
formulas
11M38 Zeta and L-functions in characteristic p
11M41 Other Dirichlet series and zeta functions {For
local and global ground fields, see 11R42, 11R52,
11S40, 11S45; for algebro-geometric methods,
see 14G10; see also 11E45, 11F66, 11F70,
11F72} 11M45 Tauberian theorems [See also 40E05]
11M99 None of the above, but in this section
11Nxx Multiplicative number theory
11N05 Distribution of primes
11N13 Primes in progressions [See also 11B25]
11N25 Distribution of integers with specified
multiplicative constraints
11N30 Tur´an theory [See also 30Bxx]
11N32 Primes represented by polynomials; other
multiplicative structure of polynomial values
11N35 Sieves
11N36 Applications of sieve methods
11N37 Asymptotic results on arithmetic functions
11N45 Asymptotic results on counting functions for
algebraic and topological structures
11N56 Rate of growth of arithmetic functions
11N60 Distribution functions associated with additive
and positive multiplicative functions
11N64 Other results on the distribution of values or the
characterization of arithmetic functions
11N69 Distribution of integers in special residue classes
11N75 Applications of automorphic functions and forms
to multiplicative problems [See also 11Fxx]
11N80 Generalized primes and integers
11N99 None of the above, but in this section
11Pxx Additive number theory; partitions
11P05 Waring’s problem and variants
11P21 Lattice points in specified regions
11P32 Goldbach-type theorems; other additive questions
involving primes
11P55 Applications of the Hardy-Littlewood method
[See also 11D85]
11P70 Inverse problems of additive number theory
11P81 Elementary theory of partitions [See also 05A17]
11P82 Analytic theory of partitions
11P83 Partitions; congruences and congruential restrictions
11P99 None of the above, but in this section
11Rxx Algebraic number theory: global fields {For
complex multiplication, see 11G15} 11R04 Algebraic numbers; rings of algebraic integers
11R06 PV-numbers and generalizations; other special
algebraic numbers
11R09 Polynomials (irreducibility, etc.)
11R11 Quadratic extensions
11R16 Cubic and quartic extensions
11R18 Cyclotomic extensions
11R20 Other abelian and metabelian extensions
11R21 Other number fields
11R23 Iwasawa theory
11R27 Units and factorization
11R29 Class numbers, class groups, discriminants
11R32 Galois theory
11R33 Integral representations related to algebraic
numbers; Galois module structure of rings of
integers [See also 20C10]
11R34 Galois cohomology [See also 12Gxx, 16H05,
19A31]
11R37 Class field theory
11R39 Langlands-Weil conjectures, nonabelian class
field theory [See also 11Fxx, 22E55]
11R42 Zeta functions and L-functions of number fields
[See also 11M41, 19F27]
MATHEMATICS SUBJECT CLASSIFICATION 2000 9 12Gxx
11R44 Distribution of prime ideals [See also 11N05]
11R45 Density theorems
11R47 Other analytic theory [See also 11Nxx]
11R52 Quaternion and other division algebras:
arithmetic, zeta functions
11R54 Other algebras and orders, and their zeta and Lfunctions
[See also 11S45, 16H05, 16Kxx]
11R56 Ad`ele rings and groups
11R58 Arithmetic theory of algebraic function fields
[See also 14–XX]
11R60 Cyclotomic function fields (class groups,
Bernoulli objects, etc.)
11R65 Class groups and Picard groups of orders
11R70 K-theory of global fields [See also 19Fxx]
11R80 Totally real and totally positive fields
[See also 12J15]
11R99 None of the above, but in this section
11Sxx Algebraic number theory: local and p-adic
fields
11S05 Polynomials
11S15 Ramification and extension theory
11S20 Galois theory
11S23 Integral representations
11S25 Galois cohomology [See also 12Gxx, 16H05]
11S31 Class field theory; p-adic formal groups
[See also 14L05]
11S37 Langlands-Weil conjectures, nonabelian class
field theory [See also 11Fxx, 22E50]
11S40 Zeta functions and L-functions [See also 11M41,
19F27]
11S45 Algebras and orders, and their zeta functions
[See also 11R52, 11R54, 16H05, 16Kxx]
11S70 K-theory of local fields [See also 19Fxx]
11S80 Other analytic theory (analogues of beta and
gamma functions, p-adic integration, etc.)
11S85 Other nonanalytic theory
11S90 Prehomogeneous vector spaces
11S99 None of the above, but in this section
11Txx Finite fields and commutative rings (numbertheoretic
aspects)
11T06 Polynomials
11T22 Cyclotomy
11T23 Exponential sums
11T24 Other character sums and Gauss sums
11T30 Structure theory
11T55 Arithmetic theory of polynomial rings over finite
fields
11T60 Finite upper half-planes
11T71 Algebraic coding theory; cryptography
11T99 None of the above, but in this section
11Uxx Connections with logic
11U05 Decidability [See also 03B25]
11U07 Ultraproducts [See also 03C20]
11U09 Model theory [See also 03Cxx]
11U10 Nonstandard arithmetic [See also 03H15]
11U99 None of the above, but in this section
11Yxx Computational number theory [See also 11–
04]
11Y05 Factorization
11Y11 Primality
11Y16 Algorithms; complexity [See also 68Q25]
11Y35 Analytic computations
11Y40 Algebraic number theory computations
11Y50 Computer solution of Diophantine equations
11Y55 Calculation of integer sequences
11Y60 Evaluation of constants
11Y65 Continued fraction calculations
11Y70 Values of arithmetic functions; tables
11Y99 None of the above, but in this section
11Z05 Miscellaneous applications of number theory
12–XX FIELD THEORY AND POLYNOMIALS
12–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
12–01 Instructional exposition (textbooks, tutorial
papers, etc.)
12–02 Research exposition (monographs, survey articles)
12–03 Historical (must also be assigned at least one
classification number from Section 01)
12–04 Explicit machine computation and programs (not
the theory of computation or programming)
12–06 Proceedings, conferences, collections, etc.
12Dxx Real and complex fields
12D05 Polynomials: factorization
12D10 Polynomials: location of zeros (algebraic
theorems) {For the analytic theory, see 26C10,
30C15} 12D15 Fields related with sums of squares (formally real
fields, Pythagorean fields, etc.) [See also 11Exx]
12D99 None of the above, but in this section
12Exx General field theory
12E05 Polynomials (irreducibility, etc.)
12E10 Special polynomials
12E12 Equations
12E15 Skew fields, division rings [See also 11R52,
11R54, 11S45, 16Kxx]
12E20 Finite fields (field-theoretic aspects)
12E25 Hilbertian fields; Hilbert’s irreducibility theorem
12E30 Field arithmetic
12E99 None of the above, but in this section
12Fxx Field extensions
12F05 Algebraic extensions
12F10 Separable extensions, Galois theory
12F12 Inverse Galois theory
12F15 Inseparable extensions
12F20 Transcendental extensions
12F99 None of the above, but in this section
12Gxx Homological methods (field theory)
12G05 Galois cohomology [See also 14F22, 16H05,
16K50]
12G10 Cohomological dimension
12G99 None of the above, but in this section
MATHEMATICS SUBJECT CLASSIFICATION 2000 12Hxx 10
12Hxx Differential and difference algebra
12H05 Differential algebra [See also 13Nxx]
12H10 Difference algebra [See also 39Axx]
12H20 Abstract differential equations [See also 34Mxx]
12H25 p-adic differential equations [See also 11S80,
14G20]
12H99 None of the above, but in this section
12Jxx Topological fields
12J05 Normed fields
12J10 Valued fields
12J12 Formally p-adic fields
12J15 Ordered fields
12J17 Topological semifields
12J20 General valuation theory [See also 13A18]
12J25 Non-Archimedean valued fields [See also 30G06,
32P05, 46S10, 47S10]
12J27 Krasner-Tate algebras [See mainly 32P05; see
also 46S10, 47S10]
12J99 None of the above, but in this section
12Kxx Generalizations of fields
12K05 Near-fields [See also 16Y30]
12K10 Semifields [See also 16Y60]
12K99 None of the above, but in this section
12Lxx Connections with logic
12L05 Decidability [See also 03B25]
12L10 Ultraproducts [See also 03C20]
12L12 Model theory [See also 03C60]
12L15 Nonstandard arithmetic [See also 03H15]
12L99 None of the above, but in this section
12Y05 Computational aspects of field theory and
polynomials
13–XX COMMUTATIVE RINGS AND ALGEBRAS
13–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
13–01 Instructional exposition (textbooks, tutorial
papers, etc.)
13–02 Research exposition (monographs, survey articles)
13–03 Historical (must also be assigned at least one
classification number from Section 01)
13–04 Explicit machine computation and programs (not
the theory of computation or programming)
13–06 Proceedings, conferences, collections, etc.
13Axx General commutative ring theory
13A02 Graded rings [See also 16W50]
13A05 Divisibility
13A10 Radical theory
13A15 Ideals; multiplicative ideal theory
13A18 Valuations and their generalizations
[See also 12J20]
13A30 Associated graded rings of ideals (Rees ring,
form ring), analytic spread and related topics
13A35 Characteristic p methods (Frobenius
endomorphism) and reduction to characteristic
p; tight closure [See also 13B22]
13A50 Actions of groups on commutative rings;
invariant theory [See also 14L24]
13A99 None of the above, but in this section
13Bxx Ring extensions and related topics
13B02 Extension theory
13B05 Galois theory
13B10 Morphisms
13B21 Integral dependence
13B22 Integral closure of rings and ideals
[See also 13A35]; integrally closed rings, related
rings (Japanese, etc.)
13B24 Going up; going down; going between
13B25 Polynomials over commutative rings
[See also 11C08, 13F20, 13M10]
13B30 Quotients and localization
13B35 Completion [See also 13J10]
13B40 ´ Etale and flat extensions; Henselization; Artin
approximation [See also 13J15, 14B12, 14B25]
13B99 None of the above, but in this section
13Cxx Theory of modules and ideals
13C05 Structure, classification theorems
13C10 Projective and free modules and ideals
[See also 19A13]
13C11 Injective and flat modules and ideals
13C12 Torsion modules and ideals
13C13 Other special types
13C14 Cohen-Macaulay modules [See also 13H10]
13C15 Dimension theory, depth, related rings (catenary,
etc.)
13C20 Class groups [See also 11R29]
13C40 Linkage, complete intersections and determinantal
ideals [See also 14M06, 14M10, 14M12]
13C99 None of the above, but in this section
13Dxx Homological methods {For noncommutative
rings, see 16Exx; for general categories, see
18Gxx} 13D02 Syzygies and resolutions
13D03 (Co)homology of commutative rings and algebras
(e.g., Hochschild, Andr´e-Quillen, cyclic, dihedral,
etc.)
13D05 Homological dimension
13D07 Homological functors on modules (Tor, Ext, etc.)
13D10 Deformations and infinitesimal methods
[See also 14B10, 14B12, 14D15, 32Gxx]
13D15 Grothendieck groups, K-theory [See also 14C35,
18F30, 19Axx, 19D50]
13D22 Homological conjectures (intersection theorems)
13D25 Complexes
13D30 Torsion theory [See also 13C12, 18E40]
13D40 Hilbert-Samuel and Hilbert-Kunz functions;
Poincar´e
series
13D45 Local cohomology [See also 14B15]
13D99 None of the above, but in this section
13Exx Chain conditions, finiteness conditions
13E05 Noetherian rings and modules
13E10 Artinian rings and modules, finite-dimensional
algebras
13E15 Rings and modules of finite generation or
presentation; number of generators
13E99 None of the above, but in this section
MATHEMATICS SUBJECT CLASSIFICATION 2000 11 14Dxx
13Fxx Arithmetic rings and other special rings
13F05 Dedekind, Pr¨ufer and Krull rings and their
generalizations
13F07 Euclidean rings and generalizations
13F10 Principal ideal rings
13F15 Factorial rings, unique factorization domains
[See also 14M05]
13F20 Polynomial rings and ideals; rings of integervalued
polynomials [See also 11C08, 13B25]
13F25 Formal power series rings [See also 13J05]
13F30 Valuation rings [See also 13A18]
13F40 Excellent rings
13F45 Seminormal rings
13F50 Rings with straightening laws, Hodge algebras
13F55 Face and Stanley-Reisner rings; simplicial
complexes [See also 55U10]
13F99 None of the above, but in this section
13G05 Integral domains
13Hxx Local rings and semilocal rings
13H05 Regular local rings
13H10 Special types (Cohen-Macaulay, Gorenstein,
Buchsbaum, etc.) [See also 14M05]
13H15 Multiplicity theory and related topics
[See also 14C17]
13H99 None of the above, but in this section
13Jxx Topological rings and modules
[See also 16W60, 16W80]
13J05 Power series rings [See also 13F25]
13J07 Analytical algebras and rings [See also 32B05]
13J10 Complete rings, completion [See also 13B35]
13J15 Henselian rings [See also 13B40]
13J20 Global topological rings
13J25 Ordered rings [See also 06F25]
13J30 Real algebra [See also 12D15, 14Pxx]
13J99 None of the above, but in this section
13K05 Witt vectors and related rings
13L05 Applications of logic to commutative algebra
[See also 03Cxx, 03Hxx]
13Mxx Finite commutative rings {For numbertheoretic
aspects, see 11Txx} 13M05 Structure
13M10 Polynomials
13M99 None of the above, but in this section
13Nxx Differential algebra [See also 12H05, 14F10]
13N05 Modules of differentials
13N10 Rings of differential operators and their modules
[See also 16S32, 32C38]
13N15 Derivations
13N99 None of the above, but in this section
13Pxx Computational aspects of commutative algebra
[See also 68W30]
13P05 Polynomials, factorization [See also 12Y05]
13P10 Polynomial ideals, Gr¨obner bases
[See also 13F20]
13P99 None of the above, but in this section
14–XX ALGEBRAIC GEOMETRY
14–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
14–01 Instructional exposition (textbooks, tutorial
papers, etc.)
14–02 Research exposition (monographs, survey articles)
14–03 Historical (must also be assigned at least one
classification number from Section 01)
14–04 Explicit machine computation and programs (not
the theory of computation or programming)
14–06 Proceedings, conferences, collections, etc.
14Axx Foundations
14A05 Relevant commutative algebra [See also 13–XX]
14A10 Varieties and morphisms
14A15 Schemes and morphisms
14A20 Generalizations (algebraic spaces, stacks)
14A22 Noncommutative algebraic geometry
14A25 Elementary questions
14A99 None of the above, but in this section
14Bxx Local theory
14B05 Singularities [See also 14E15, 14H20, 14J17,
32Sxx, 58Kxx]
14B07 Deformations of singularities [See also 14D15,
32S30]
14B10 Infinitesimal methods [See also 13D10]
14B12 Local deformation theory, Artin approximation,
etc. [See also 13B40, 13D10]
14B15 Local cohomology [See also 13D45, 32C36]
14B20 Formal neighborhoods
14B25 Local structure of morphisms: ´etale, flat, etc.
[See also 13B40]
14B99 None of the above, but in this section
14Cxx Cycles and subschemes
14C05 Parametrization (Chow and Hilbert schemes)
14C15 Chow groups and rings
14C17 Intersection theory, characteristic classes,
intersection multiplicities [See also 13H15]
14C20 Divisors, linear systems, invertible sheaves
14C21 Pencils, nets, webs [See also 53A60]
14C22 Picard groups
14C25 Algebraic cycles
14C30 Transcendental methods, Hodge theory
[See also 14D07, 32G20, 32J25, 32S35], Hodge
conjecture
14C34 Torelli problem [See also 32G20]
14C35 Applications of methods of algebraic K-theory
[See also 19Exx]
14C40 Riemann-Roch theorems [See also 19E20, 19L10]
14C99 None of the above, but in this section
14Dxx Families, fibrations
14D05 Structure of families (Picard-Lefschetz,
monodromy, etc.)
14D06 Fibrations, degenerations
14D07 Variation of Hodge structures [See also 32G20]
14D10 Arithmetic ground fields (finite, local, global)
14D15 Formal methods; deformations [See also 13D10,
14B07, 32Gxx]
MATHEMATICS SUBJECT CLASSIFICATION 2000 14Dxx 12
14D20 Algebraic moduli problems, moduli of vector
bundles {For analytic moduli problems, see
32G13} 14D21 Applications of vector bundles and moduli
spaces in mathematical physics (twistor theory,
instantons, quantum field theory)
14D22 Fine and coarse moduli spaces
14D99 None of the above, but in this section
14Exx Birational geometry
14E05 Rational and birational maps
14E07 Birational automorphisms, Cremona group and
generalizations
14E08 Rationality questions
14E15 Global theory and resolution of singularities
[See also 14B05, 32S20, 32S45]
14E20 Coverings [See also 14H30]
14E22 Ramification problems [See also 11S15]
14E25 Embeddings
14E30 Minimal model program (Mori theory, extremal
rays)
14E99 None of the above, but in this section
14Fxx (Co)homology theory [See also 13Dxx]
14F05 Vector bundles, sheaves, related constructions
[See also 14H60, 14J60, 18F20, 32Lxx, 46M20]
14F10 Differentials and other special sheaves
[See also 13Nxx, 32C38]
14F17 Vanishing theorems [See also 32L20]
14F20 ´ Etale and other Grothendieck topologies and
cohomologies
14F22 Brauer groups of schemes [See also 12G05,
16K50]
14F25 Classical real and complex cohomology
14F30 p-adic cohomology, crystalline cohomology
14F35 Homotopy theory; fundamental groups
[See also 14H30]
14F40 de Rham cohomology [See also 14C30, 32C35,
32L10]
14F42 Motivic cohomology
14F43 Other algebro-geometric (co)homologies (e.g.,
intersection, equivariant, Lawson, Deligne
(co)homologies)
14F45 Topological properties
14F99 None of the above, but in this section
14Gxx Arithmetic problems. Diophantine geometry
[See also 11Dxx, 11Gxx]
14G05 Rational points
14G10 Zeta-functions and related questions
[See also 11G40] (Birch-Swinnerton-Dyer
conjecture)
14G15 Finite ground fields
14G20 Local ground fields
14G22 Rigid analytic geometry
14G25 Global ground fields
14G27 Other nonalgebraically closed ground fields
14G32 Universal profinite groups (relationship to moduli
spaces, projective and moduli towers, Galois
theory)
14G35 Modular and Shimura varieties [See also 11F41,
11F46, 11G18]
14G40 Arithmetic varieties and schemes; Arakelov
theory; heights [See also 11G50]
14G50 Applications to coding theory and cryptography
[See also 94A60, 94B27, 94B40]
14G99 None of the above, but in this section
14Hxx Curves
14H05 Algebraic functions; function fields
[See also 11R58]
14H10 Families, moduli (algebraic)
14H15 Families, moduli (analytic) [See also 30F10,
32Gxx]
14H20 Singularities, local rings [See also 13Hxx,
14B05]
14H25 Arithmetic ground fields [See also 11Dxx,
11G05, 14Gxx]
14H30 Coverings, fundamental group [See also 14E20,
14F35]
14H37 Automorphisms
14H40 Jacobians, Prym varieties [See also 32G20]
14H42 Theta functions; Schottky problem
[See also 14K25, 32G20]
14H45 Special curves and curves of low genus
14H50 Plane and space curves
14H51 Special divisors (gonality, Brill-Noether theory)
14H52 Elliptic curves [See also 11G05, 11G07, 14Kxx]
14H55 Riemann surfaces; Weierstrass points; gap
sequences [See also 30Fxx]
14H60 Vector bundles on curves and their moduli
[See also 14D20, 14F05]
14H70 Relationships with integrable systems
14H81 Relationships with physics
14H99 None of the above, but in this section
14Jxx Surfaces and higher-dimensional varieties {For
analytic theory, see 32Jxx} 14J10 Families, moduli, classification: algebraic theory
14J15 Moduli, classification: analytic theory; relations
with modular forms [See also 32G13]
14J17 Singularities [See also 14B05, 14E15]
14J20 Arithmetic ground fields [See also 11Dxx,
11G25, 11G35, 14Gxx]
14J25 Special surfaces {For Hilbert modular surfaces,
see 14G35} 14J26 Rational and ruled surfaces
14J27 Elliptic surfaces
14J28 K3 surfaces and Enriques surfaces
14J29 Surfaces of general type
14J30 3-folds
14J32 Calabi-Yau manifolds, mirror symmetry
14J35 4-folds
14J40 n-folds (n > 4)
14J45 Fano varieties
14J50 Automorphisms of surfaces and higherdimensional
varieties
14J60 Vector bundles on surfaces and higherdimensional
varieties, and their moduli
[See also 14D20, 14F05, 32Lxx]
MATHEMATICS SUBJECT CLASSIFICATION 2000 13 15–XX
14J70 Hypersurfaces
14J80 Topology of surfaces (Donaldson polynomials,
Seiberg-Witten invariants)
14J81 Relationships with physics
14J99 None of the above, but in this section
14Kxx Abelian varieties and schemes
14K02 Isogeny
14K05 Algebraic theory
14K10 Algebraic moduli, classification [See also 11G15]
14K12 Subvarieties
14K15 Arithmetic ground fields [See also 11Dxx, 11Fxx,
11Gxx, 14Gxx]
14K20 Analytic theory; abelian integrals and differentials
14K22 Complex multiplication [See also 11G15]
14K25 Theta functions [See also 14H42]
14K30 Picard schemes, higher Jacobians
[See also 14H40, 32G20]
14K99 None of the above, but in this section
14Lxx Algebraic groups {For linear algebraic groups,
see 20Gxx; for Lie algebras, see 17B45} 14L05 Formal groups, p-divisible groups
[See also 55N22]
14L10 Group varieties
14L15 Group schemes
14L17 Affine algebraic groups, hyperalgebra
constructions [See also 17B45, 18D35]
14L24 Geometric invariant theory [See also 13A50]
14L30 Group actions on varieties or schemes (quotients)
[See also 13A50, 14L24]
14L35 Classical groups (geometric aspects)
[See also 20Gxx, 51N30]
14L40 Other algebraic groups (geometric aspects)
14L99 None of the above, but in this section
14Mxx Special varieties
14M05 Varieties defined by ring conditions (factorial,
Cohen-Macaulay, seminormal) [See also 13F45,
13H10]
14M06 Linkage [See also 13C40]
14M07 Low codimension problems
14M10 Complete intersections [See also 13C40]
14M12 Determinantal varieties [See also 13C40]
14M15 Grassmannians, Schubert varieties, flag manifolds
[See also 32M10, 51M35]
14M17 Homogeneous spaces and generalizations
[See also 32M10, 53C30, 57T15]
14M20 Rational and unirational varieties
14M25 Toric varieties, Newton polyhedra
[See also 52B20]
14M30 Supervarieties [See also 32C11, 58A50]
14M99 None of the above, but in this section
14Nxx Projective and enumerative geometry
[See also 51–XX]
14N05 Projective techniques [See also 51N35]
14N10 Enumerative problems (combinatorial problems)
14N15 Classical problems, Schubert calculus
14N20 Configurations of linear subspaces
14N25 Varieties of low degree
14N30 Adjunction problems
14N35 Gromov-Witten invariants, quantum cohomology
[See also 53D45]
14N99 None of the above, but in this section
14Pxx Real algebraic and real analytic geometry
14P05 Real algebraic sets [See also 12Dxx]
14P10 Semialgebraic sets and related spaces
14P15 Real analytic and semianalytic sets
[See also 32B20, 32C05]
14P20 Nash functions and manifolds [See also 32C07,
58A07]
14P25 Topology of real algebraic varieties
14P99 None of the above, but in this section
14Qxx Computational aspects in algebraic geometry
[See also 12Y05, 13Pxx, 68W30]
14Q05 Curves
14Q10 Surfaces, hypersurfaces
14Q15 Higher-dimensional varieties
14Q20 Effectivity
14Q99 None of the above, but in this section
14Rxx Affine geometry
14R05 Classification of affine varieties
14R10 Affine spaces (automorphisms, embeddings,
exotic structures, cancellation problem)
14R15 Jacobian problem
14R20 Group actions on affine varieties
[See also 13A50, 14L30]
14R25 Affine fibrations [See also 14D06]
14R99 None of the above, but in this section
15–XX LINEAR AND MULTILINEAR ALGEBRA;
MATRIX THEORY
15–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
15–01 Instructional exposition (textbooks, tutorial
papers, etc.)
15–02 Research exposition (monographs, survey articles)
15–03 Historical (must also be assigned at least one
classification number from Section 01)
15–04 Explicit machine computation and programs (not
the theory of computation or programming)
15–06 Proceedings, conferences, collections, etc.
15A03 Vector spaces, linear dependence, rank
15A04 Linear transformations, semilinear transformations
15A06 Linear equations
15A09 Matrix inversion, generalized inverses
15A12 Conditioning of matrices [See also 65F35]
15A15 Determinants, permanents, other special matrix
functions [See also 19B10, 19B14]
15A18 Eigenvalues, singular values, and eigenvectors
15A21 Canonical forms, reductions, classification
15A22 Matrix pencils [See also 47A56]
15A23 Factorization of matrices
15A24 Matrix equations and identities
15A27 Commutativity
15A29 Inverse problems
15A30 Algebraic systems of matrices [See also 16S50,
20Gxx, 20Hxx]
MATHEMATICS SUBJECT CLASSIFICATION 2000 15–XX 14
15A33 Matrices over special rings (quaternions, finite
fields, etc.)
15A36 Matrices of integers [See also 11C20]
15A39 Linear inequalities
15A42 Inequalities involving eigenvalues and
eigenvectors
15A45 Miscellaneous inequalities involving matrices
15A48 Positive matrices and their generalizations; cones
of matrices
15A51 Stochastic matrices
15A52 Random matrices
15A54 Matrices over function rings in one or more
variables
15A57 Other types of matrices (Hermitian, skew-
Hermitian, etc.)
15A60 Norms of matrices, numerical range, applications
of functional analysis to matrix theory
[See also 65F35, 65J05]
15A63 Quadratic and bilinear forms, inner products [See
mainly 11Exx]
15A66 Clifford algebras, spinors
15A69 Multilinear algebra, tensor products
15A72 Vector and tensor algebra, theory of invariants
[See also 13A50, 14L24]
15A75 Exterior algebra, Grassmann algebras
15A78 Other algebras built from modules
15A90 Applications of matrix theory to physics
15A99 Miscellaneous topics
16–XX ASSOCIATIVE RINGS AND ALGEBRAS
{For the commutative case, see 13–XX} 16–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
16–01 Instructional exposition (textbooks, tutorial
papers, etc.)
16–02 Research exposition (monographs, survey articles)
16–03 Historical (must also be assigned at least one
classification number from Section 01)
16–04 Explicit machine computation and programs (not
the theory of computation or programming)
16–06 Proceedings, conferences, collections, etc.
16Bxx General and miscellaneous
16B50 Category-theoretic methods and results (except as
in 16D90) [See also 18–XX]
16B70 Applications of logic [See also 03Cxx]
16B99 None of the above, but in this section
16Dxx Modules, bimodules and ideals
16D10 General module theory
16D20 Bimodules
16D25 Ideals
16D30 Infinite-dimensional simple rings (except as in
16Kxx)
16D40 Free, projective, and flat modules and ideals
[See also 19A13]
16D50 Injective modules, self-injective rings
[See also 16L60]
16D60 Simple and semisimple modules, primitive rings
and ideals
16D70 Structure and classification (except as in 16Gxx),
direct sum decomposition, cancellation
16D80 Other classes of modules and ideals
[See also 16G50]
16D90 Module categories [See also 16Gxx, 16S90];
module theory in a category-theoretic context;
Morita equivalence and duality
16D99 None of the above, but in this section
16Exx Homological methods {For commutative rings,
see 13Dxx; for general categories, see 18Gxx} 16E05 Syzygies, resolutions, complexes
16E10 Homological dimension
16E20 Grothendieck groups, K-theory, etc.
[See also 18F30, 19Axx, 19D50]
16E30 Homological functors on modules (Tor, Ext, etc.)
16E40 (Co)homology of rings and algebras (e.g.
Hochschild, cyclic, dihedral, etc.)
16E45 Differential graded algebras and applications
16E50 von Neumann regular rings and generalizations
16E60 Semihereditary and hereditary rings, free ideal
rings, Sylvester rings, etc.
16E65 Homological conditions on rings (generalizations
of regular, Gorenstein, Cohen-Macaulay rings,
etc.)
16E99 None of the above, but in this section
16Gxx Representation theory of rings and algebras
16G10 Representations of Artinian rings
16G20 Representations of quivers and partially ordered
sets
16G30 Representations of orders, lattices, algebras over
commutative rings [See also 16H05]
16G50 Cohen-Macaulay modules
16G60 Representation type (finite, tame, wild, etc.)
16G70 Auslander-Reiten sequences (almost split
sequences) and Auslander-Reiten quivers
16G99 None of the above, but in this section
16H05 Orders and arithmetic, separable algebras,
Azumaya algebras [See also 11R52, 11R54,
11S45]
16Kxx Division rings and semisimple Artin rings
[See also 12E15, 15A30]
16K20 Finite-dimensional {For crossed products, see
16S35} 16K40 Infinite-dimensional and general
16K50 Brauer groups [See also 12G05, 14F22]
16K99 None of the above, but in this section
16Lxx Local rings and generalizations
16L30 Noncommutative local and semilocal rings,
perfect rings
16L60 Quasi-Frobenius rings [See also 16D50]
16L99 None of the above, but in this section
16Nxx Radicals and radical properties of rings
16N20 Jacobson radical, quasimultiplication
16N40 Nil and nilpotent radicals, sets, ideals, rings
16N60 Prime and semiprime rings [See also 16D60,
16U10]
16N80 General radicals and rings {For radicals in
module categories, see 16S90}
MATHEMATICS SUBJECT CLASSIFICATION 2000 15 17Axx
16N99 None of the above, but in this section
16Pxx Chain conditions, growth conditions, and other
forms of finiteness
16P10 Finite rings and finite-dimensional algebras {For
semisimple, see 16K20; for commutative, see
11Txx, 13Mxx} 16P20 Artinian rings and modules
16P40 Noetherian rings and modules
16P50 Localization and Noetherian rings
[See also 16U20]
16P60 Chain conditions on annihilators and summands:
Goldie-type conditions [See also 16U20], Krull
dimension
16P70 Chain conditions on other classes of submodules,
ideals, subrings, etc.; coherence
16P90 Growth rate, Gel0fand-Kirillov dimension
16P99 None of the above, but in this section
16Rxx Rings with polynomial identity
16R10 T-ideals, identities, varieties of rings and algebras
16R20 Semiprime p.i. rings, rings embeddable in
matrices over commutative rings
16R30 Trace rings and invariant theory
16R40 Identities other than those of matrices over
commutative rings
16R50 Other kinds of identities (generalized polynomial,
rational, involution)
16R99 None of the above, but in this section
16Sxx Rings and algebras arising under various
constructions
16S10 Rings determined by universal properties (free
algebras, coproducts, adjunction of inverses, etc.)
16S15 Finite generation, finite presentability, normal
forms (diamond lemma, term-rewriting)
16S20 Centralizing and normalizing extensions
16S30 Universal enveloping algebras of Lie algebras
[See mainly 17B35]
16S32 Rings of differential operators [See also 13N10,
32C38]
16S34 Group rings [See also 20C05, 20C07], Laurent
polynomial rings
16S35 Twisted and skew group rings, crossed products
16S36 Ordinary and skew polynomial rings and
semigroup rings [See also 20M25]
16S37 Quadratic and Koszul algebras
16S38 Rings arising from non-commutative algebraic
geometry
16S40 Smash products of general Hopf actions
[See also 16W30]
16S50 Endomorphism rings; matrix rings [See also 15–
XX]
16S60 Rings of functions, subdirect products, sheaves of
rings
16S70 Extensions of rings by ideals
16S80 Deformations of rings [See also 13D10, 14D15]
16S90 Maximal ring of quotients, torsion theories,
radicals on module categories [See also 13D30,
18E40] {For radicals of rings, see 16Nxx} 16S99 None of the above, but in this section
16Uxx Conditions on elements
16U10 Integral domains
16U20 Ore rings, multiplicative sets, Ore localization
16U30 Divisibility, noncommutative UFDs
16U60 Units, groups of units
16U70 Center, normalizer (invariant elements)
16U80 Generalizations of commutativity
16U99 None of the above, but in this section
16Wxx Rings and algebras with additional structure
16W10 Rings with involution; Lie, Jordan and other
nonassociative structures [See also 17B60,
17C50, 46Kxx]
16W20 Automorphisms and endomorphisms
16W22 Actions of groups and semigroups; invariant
theory
16W25 Derivations, actions of Lie algebras
16W30 Coalgebras, bialgebras, Hopf algebras
[See also 16S40, 57T05]; rings, modules, etc. on
which these act
16W35 Ring-theoretic aspects of quantum groups
[See also 17B37, 20G42, 81R50]
16W50 Graded rings and modules
16W55 “Super” (or “skew”) structure [See also 17A70,
17Bxx, 17C70] {For exterior algebras, see
15A75; for Clifford algebras, see 11E88, 15A66} 16W60 Valuations, completions, formal power series and
related constructions [See also 13Jxx]
16W70 Filtered rings; filtrational and graded techniques
16W80 Topological and ordered rings and modules
[See also 06F25, 13Jxx]
16W99 None of the above, but in this section
16Yxx Generalizations {For nonassociative rings, see
17–XX} 16Y30 Near-rings [See also 12K05]
16Y60 Semirings [See also 12K10]
16Y99 None of the above, but in this section
16Z05 Computational aspects of associative rings
[See also 68W30]
17–XX NONASSOCIATIVE RINGS AND
ALGEBRAS
17–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
17–01 Instructional exposition (textbooks, tutorial
papers, etc.)
17–02 Research exposition (monographs, survey articles)
17–03 Historical (must also be assigned at least one
classification number from Section 01)
17–04 Explicit machine computation and programs (not
the theory of computation or programming)
17–06 Proceedings, conferences, collections, etc.
17–08 Computational methods
17Axx General nonassociative rings
17A01 General theory
17A05 Power-associative rings
17A15 Noncommutative Jordan algebras
17A20 Flexible algebras
17A30 Algebras satisfying other identities
MATHEMATICS SUBJECT CLASSIFICATION 2000 17Axx 16
17A32 Leibniz algebras
17A35 Division algebras
17A36 Automorphisms, derivations, other operators
17A40 Ternary compositions
17A42 Other n-ary compositions (n 3)
17A45 Quadratic algebras (but not quadratic Jordan
algebras)
17A50 Free algebras
17A60 Structure theory
17A65 Radical theory
17A70 Superalgebras
17A75 Composition algebras
17A80 Valued algebras
17A99 None of the above, but in this section
17Bxx Lie algebras and Lie superalgebras {For Lie
groups, see 22Exx} 17B01 Identities, free Lie (super)algebras
17B05 Structure theory
17B10 Representations, algebraic theory (weights)
17B15 Representations, analytic theory
17B20 Simple, semisimple, reductive (super)algebras
(roots)
17B25 Exceptional (super)algebras
17B30 Solvable, nilpotent (super)algebras
17B35 Universal enveloping (super)algebras
[See also 16S30]
17B37 Quantum groups (quantized enveloping algebras)
and related deformations [See also 16W35,
20G42, 81R50, 82B23]
17B40 Automorphisms, derivations, other operators
17B45 Lie algebras of linear algebraic groups
[See also 14Lxx and 20Gxx]
17B50 Modular Lie (super)algebras
17B55 Homological methods in Lie (super)algebras
17B56 Cohomology of Lie (super)algebras
17B60 Lie (super)algebras associated with other
structures (associative, Jordan, etc.)
[See also 16W10, 17C40, 17C50]
17B62 Lie bialgebras
17B63 Poisson algebras
17B65 Infinite-dimensional Lie (super)algebras
[See also 22E65]
17B66 Lie algebras of vector fields and related (super)
algebras
17B67 Kac-Moody (super)algebras (structure and
representation theory)
17B68 Virasoro and related algebras
17B69 Vertex operators; vertex operator algebras and
related structures
17B70 Graded Lie (super)algebras
17B75 Color Lie (super)algebras
17B80 Applications to integrable systems
17B81 Applications to physics
17B99 None of the above, but in this section
17Cxx Jordan algebras (algebras, triples and pairs)
17C05 Identities and free Jordan structures
17C10 Structure theory
17C17 Radicals
17C20 Simple, semisimple algebras
17C27 Idempotents, Peirce decompositions
17C30 Associated groups, automorphisms
17C36 Associated manifolds
17C37 Associated geometries
17C40 Exceptional Jordan structures
17C50 Jordan structures associated with other structures
[See also 16W10]
17C55 Finite-dimensional structures
17C60 Division algebras
17C65 Jordan structures on Banach spaces and algebras
[See also 46H70, 46L70]
17C70 Super structures
17C90 Applications to physics
17C99 None of the above, but in this section
17Dxx Other nonassociative rings and algebras
17D05 Alternative rings
17D10 Mal0cev (Mal0tsev) rings and algebras
17D15 Right alternative rings
17D20 (
, )-rings, including (1,-1)-rings
17D25 Lie-admissible algebras
17D92 Genetic algebras
17D99 None of the above, but in this section
18–XX CATEGORY THEORY; HOMOLOGICAL
ALGEBRA {For commutative rings see 13Dxx,
for associative rings 16Exx, for groups 20Jxx,
for topological groups and related structures
57Txx; see also 55Nxx and 55Uxx for algebraic
topology} 18–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
18–01 Instructional exposition (textbooks, tutorial
papers, etc.)
18–02 Research exposition (monographs, survey articles)
18–03 Historical (must also be assigned at least one
classification number from Section 01)
18–04 Explicit machine computation and programs (not
the theory of computation or programming)
18–06 Proceedings, conferences, collections, etc.
18Axx General theory of categories and functors
18A05 Definitions, generalizations
18A10 Graphs, diagram schemes, precategories [See
especially 20L05]
18A15 Foundations, relations to logic and deductive
systems [See also 03–XX]
18A20 Epimorphisms, monomorphisms, special classes
of morphisms, null morphisms
18A22 Special properties of functors (faithful, full, etc.)
18A23 Natural morphisms, dinatural morphisms
18A25 Functor categories, comma categories
18A30 Limits and colimits (products, sums, directed
limits, pushouts, fiber products, equalizers,
kernels, ends and coends, etc.)
18A32 Factorization of morphisms, substructures,
quotient structures, congruences, amalgams
18A35 Categories admitting limits (complete categories),
functors preserving limits, completions
MATHEMATICS SUBJECT CLASSIFICATION 2000 17 19Axx
18A40 Adjoint functors (universal constructions,
reflective subcategories, Kan extensions, etc.)
18A99 None of the above, but in this section
18Bxx Special categories
18B05 Category of sets, characterizations [See also 03–
XX]
18B10 Category of relations, additive relations
18B15 Embedding theorems, universal categories
[See also 18E20]
18B20 Categories of machines, automata, operative
categories [See also 03D05, 68Qxx]
18B25 Topoi [See also 03G30]
18B30 Categories of topological spaces and continuous
mappings [See also 54–XX]
18B35 Preorders, orders and lattices (viewed as
categories) [See also 06–XX]
18B40 Groupoids, semigroupoids, semigroups, groups
(viewed as categories) [See also 20Axx, 20L05,
20Mxx]
18B99 None of the above, but in this section
18Cxx Categories and theories
18C05 Equational categories [See also 03C05, 08C05]
18C10 Theories (e.g. algebraic theories), structure, and
semantics [See also 03G30]
18C15 Triples (= standard construction, monad or triad),
algebras for a triple, homology and derived
functors for triples [See also 18Gxx]
18C20 Algebras and Kleisli categories associated with
monads
18C30 Sketches and generalizations
18C35 Accessible and locally presentable categories
18C50 Categorical semantics of formal languages
[See also 68Q55, 68Q65]
18C99 None of the above, but in this section
18Dxx Categories with structure
18D05 Double categories, 2-categories, bicategories and
generalizations
18D10 Monoidal categories (= multiplicative categories),
symmetric monoidal categories, braided
categories [See also 19D23]
18D15 Closed categories (closed monoidal and Cartesian
closed categories, etc.)
18D20 Enriched categories (over closed or monoidal
categories)
18D25 Strong functors, strong adjunctions
18D30 Fibered categories
18D35 Structured objects in a category (group objects,
etc.)
18D50 Operads [See also 55P48]
18D99 None of the above, but in this section
18Exx Abelian categories
18E05 Preadditive, additive categories
18E10 Exact categories, abelian categories
18E15 Grothendieck categories
18E20 Embedding theorems [See also 18B15]
18E25 Derived functors and satellites
18E30 Derived categories, triangulated categories
18E35 Localization of categories
18E40 Torsion theories, radicals [See also 13D30,
16S90]
18E99 None of the above, but in this section
18Fxx Categories and geometry
18F05 Local categories and functors
18F10 Grothendieck topologies [See also 14F20]
18F15 Abstract manifolds and fiber bundles
[See also 55Rxx, 57Pxx]
18F20 Presheaves and sheaves [See also 14F05, 32C35,
32L10, 54B40, 55N30]
18F25 Algebraic K-theory and L-theory
[See also 11Exx, 11R70, 11S70, 12–XX, 13D15,
14Cxx, 16E20, 19–XX, 46L80, 57R65, 57R67]
18F30 Grothendieck groups [See also 13D15, 16E20,
19Axx]
18F99 None of the above, but in this section
18Gxx Homological algebra [See also 13Dxx, 16Exx,
20Jxx, 55Nxx, 55Uxx, 57Txx]
18G05 Projectives and injectives [See also 13C10,
13C11, 16D40, 16D50]
18G10 Resolutions; derived functors [See also 13D02,
16E05, 18E25]
18G15 Ext and Tor, generalizations, K¨unneth formula
[See also 55U25]
18G20 Homological dimension [See also 13D05, 16E10]
18G25 Relative homological algebra, projective classes
18G30 Simplicial sets, simplicial objects (in a category)
[See also 55U10]
18G35 Chain complexes [See also 18E30, 55U15]
18G40 Spectral sequences, hypercohomology
[See also 55Txx]
18G50 Nonabelian homological algebra
18G55 Homotopical algebra
18G60 Other (co)homology theories [See also 19D55,
46L80, 58J20, 58J22]
18G99 None of the above, but in this section
19–XX K-THEORY [See also 16E20, 18F25]
19–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
19–01 Instructional exposition (textbooks, tutorial
papers, etc.)
19–02 Research exposition (monographs, survey articles)
19–03 Historical (must also be assigned at least one
classification number from Section 01)
19–04 Explicit machine computation and programs (not
the theory of computation or programming)
19–06 Proceedings, conferences, collections, etc.
19Axx Grothendieck groups and K0 [See also 13D15,
18F30]
19A13 Stability for projective modules [See also 13C10]
19A15 Efficient generation
19A22 Frobenius induction, Burnside and representation
rings
19A31 K0 of group rings and orders
19A49 K0 of other rings
19A99 None of the above, but in this section
MATHEMATICS SUBJECT CLASSIFICATION 2000 19Bxx 18
19Bxx Whitehead groups and K1
19B10 Stable range conditions
19B14 Stability for linear groups
19B28 K1 of group rings and orders [See also 57Q10]
19B37 Congruence subgroup problems [See also 20H05]
19B99 None of the above, but in this section
19Cxx Steinberg groups and K2
19C09 Central extensions and Schur multipliers
19C20 Symbols, presentations and stability of K2
19C30 K2 and the Brauer group
19C40 Excision for K2
19C99 None of the above, but in this section
19Dxx Higher algebraic K-theory
19D06 Q- and plus-constructions
19D10 Algebraic K-theory of spaces
19D23 Symmetric monoidal categories [See also 18D10]
19D25 Karoubi-Villamayor-Gersten K-theory
19D35 Negative K-theory, NK and Nil
19D45 Higher symbols, Milnor K-theory
19D50 Computations of higher K-theory of rings
[See also 13D15, 16E20]
19D55 K-theory and homology; cyclic homology and
cohomology [See also 18G60]
19D99 None of the above, but in this section
19Exx K-theory in geometry
19E08 K-theory of schemes [See also 14C35]
19E15 Algebraic cycles and motivic cohomology
[See also 14C25, 14C35]
19E20 Relations with cohomology theories
[See also 14Fxx]
19E99 None of the above, but in this section
19Fxx K-theory in number theory [See also 11R70,
11S70]
19F05 Generalized class field theory [See also 11G45]
19F15 Symbols and arithmetic [See also 11R37]
19F27 ´ Etale cohomology, higher regulators, zeta and
L-functions [See also 11G40, 11R42, 11S40,
14F20, 14G10]
19F99 None of the above, but in this section
19Gxx K-theory of forms [See also 11Exx]
19G05 Stability for quadratic modules
19G12 Witt groups of rings [See also 11E81]
19G24 L-theory of group rings [See also 11E81]
19G38 Hermitian K-theory, relations with K-theory of
rings
19G99 None of the above, but in this section
19Jxx Obstructions from topology
19J05 Finiteness and other obstructions in K0
19J10 Whitehead (and related) torsion
19J25 Surgery obstructions [See also 57R67]
19J35 Obstructions to group actions
19J99 None of the above, but in this section
19Kxx K-theory and operator algebras
[See mainly 46L80, and also 46M20]
19K14 K0 as an ordered group, traces
19K33 EXT and K-homology [See also 55N22]
19K35 Kasparov theory (KK-theory) [See also 58J22]
19K56 Index theory [See also 58J20, 58J22]
19K99 None of the above, but in this section
19Lxx Topological K-theory [See also 55N15, 55R50,
55S25]
19L10 Riemann-Roch theorems, Chern characters
19L20 J-homomorphism, Adams operations
[See also 55Q50]
19L41 Connective K-theory, cobordism
[See also 55N22]
19L47 Equivariant K-theory [See also 55N91, 55P91,
55Q91, 55R91, 55S91]
19L64 Computations, geometric applications
19L99 None of the above, but in this section
19M05 Miscellaneous applications of K-theory
20–XX GROUP THEORY AND
GENERALIZATIONS
20–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
20–01 Instructional exposition (textbooks, tutorial
papers, etc.)
20–02 Research exposition (monographs, survey articles)
20–03 Historical (must also be assigned at least one
classification number from Section 01)
20–04 Explicit machine computation and programs (not
the theory of computation or programming)
20–06 Proceedings, conferences, collections, etc.
20Axx Foundations
20A05 Axiomatics and elementary properties
20A10 Metamathematical considerations {For word
problems, see 20F10} 20A15 Applications of logic to group theory
20A99 None of the above, but in this section
20Bxx Permutation groups
20B05 General theory for finite groups
20B07 General theory for infinite groups
20B10 Characterization theorems
20B15 Primitive groups
20B20 Multiply transitive finite groups
20B22 Multiply transitive infinite groups
20B25 Finite automorphism groups of algebraic,
geometric, or combinatorial structures
[See also 05Bxx, 12F10, 20G40, 20H30, 51–XX]
20B27 Infinite automorphism groups [See also 12F10]
20B30 Symmetric groups
20B35 Subgroups of symmetric groups
20B40 Computational methods
20B99 None of the above, but in this section
20Cxx Representation theory of groups
[See also 19A22 (for representation rings and
Burnside rings)]
20C05 Group rings of finite groups and their modules
[See also 16S34]
20C07 Group rings of infinite groups and their modules
[See also 16S34]
20C08 Hecke algebras and their representations
20C10 Integral representations of finite groups
20C11 p-adic representations of finite groups
20C12 Integral representations of infinite groups
MATHEMATICS SUBJECT CLASSIFICATION 2000 19 20Gxx
20C15 Ordinary representations and characters
20C20 Modular representations and characters
20C25 Projective representations and multipliers
20C30 Representations of finite symmetric groups
20C32 Representations of infinite symmetric groups
20C33 Representations of finite groups of Lie type
20C34 Representations of sporadic groups
20C35 Applications of group representations to physics
20C40 Computational methods
20C99 None of the above, but in this section
20Dxx Abstract finite groups
20D05 Classification of simple and nonsolvable groups
20D06 Simple groups: alternating groups and groups of
Lie type [See also 20Gxx]
20D08 Simple groups: sporadic groups
20D10 Solvable groups, theory of formations, Schunck
classes, Fitting classes, -length, ranks
[See also 20F17]
20D15 Nilpotent groups, p-groups
20D20 Sylow subgroups, Sylow properties, -groups, -
structure
20D25 Special subgroups (Frattini, Fitting, etc.)
20D30 Series and lattices of subgroups
20D35 Subnormal subgroups
20D40 Products of subgroups
20D45 Automorphisms
20D60 Arithmetic and combinatorial problems
20D99 None of the above, but in this section
20Exx Structure and classification of infinite or finite
groups
20E05 Free nonabelian groups
20E06 Free products, free products with amalgamation,
Higman-Neumann-Neumann extensions, and
generalizations
20E07 Subgroup theorems; subgroup growth
20E08 Groups acting on trees [See also 20F65]
20E10 Quasivarieties and varieties of groups
20E15 Chains and lattices of subgroups, subnormal
subgroups [See also 20F22]
20E18 Limits, profinite groups
20E22 Extensions, wreath products, and other
compositions [See also 20J05]
20E25 Local properties
20E26 Residual properties and generalizations
20E28 Maximal subgroups
20E32 Simple groups [See also 20D05]
20E34 General structure theorems
20E36 General theorems concerning automorphisms of
groups
20E42 Groups with a BN-pair; buildings
[See also 51E24]
20E45 Conjugacy classes
20E99 None of the above, but in this section
20Fxx Special aspects of infinite or finite groups
20F05 Generators, relations, and presentations
20F06 Cancellation theory; application of van Kampen
diagrams [See also 57M05]
20F10 Word problems, other decision problems,
connections with logic and automata
[See also 03B25, 03D05, 03D40, 06B25, 08A50,
68Q70]
20F12 Commutator calculus
20F14 Derived series, central series, and generalizations
20F16 Solvable groups, supersolvable groups
[See also 20D10]
20F17 Formations of groups, Fitting classes
[See also 20D10]
20F18 Nilpotent groups [See also 20D15]
20F19 Generalizations of solvable and nilpotent groups
20F22 Other classes of groups defined by subgroup
chains
20F24 FC-groups and their generalizations
20F28 Automorphism groups of groups
[See also 20E36]
20F29 Representations of groups as automorphism
groups of algebraic systems
20F34 Fundamental groups and their automorphisms
[See also 57M05, 57Sxx]
20F36 Braid groups; Artin groups
20F38 Other groups related to topology or analysis
20F40 Associated Lie structures
20F45 Engel conditions
20F50 Periodic groups; locally finite groups
20F55 Reflection and Coxeter groups [See also 22E40,
51F15]
20F60 Ordered groups [See mainly 06F15]
20F65 Geometric group theory [See also 05C25, 20E08,
57Mxx]
20F67 Hyperbolic groups and nonpositively curved
groups
20F69 Asymptotic properties of groups
20F99 None of the above, but in this section
20Gxx Linear algebraic groups (classical groups)
{For arithmetic theory, see 11E57, 11H56; for
geometric theory, see 14Lxx, 22Exx; for other
methods in representation theory, see 15A30,
22E45, 22E46, 22E47, 22E50, 22E55} 20G05 Representation theory
20G10 Cohomology theory
20G15 Linear algebraic groups over arbitrary fields
20G20 Linear algebraic groups over the reals, the
complexes, the quaternions
20G25 Linear algebraic groups over local fields and their
integers
20G30 Linear algebraic groups over global fields and
their integers
20G35 Linear algebraic groups over ad`eles and other
rings and schemes
20G40 Linear algebraic groups over finite fields
20G42 Quantum groups (quantized function algebras)
and their representations [See also 16W35,
17B37, 81R50]
20G45 Applications to physics
20G99 None of the above, but in this section
MATHEMATICS SUBJECT CLASSIFICATION 2000 20Hxx 20
20Hxx Other groups of matrices [See also 15A30]
20H05 Unimodular groups, congruence subgroups
[See also 11F06, 19B37, 22E40, 51F20]
20H10 Fuchsian groups and their generalizations
[See also 11F06, 22E40, 30F35, 32Nxx]
20H15 Other geometric groups, including
crystallographic groups [See also 51–XX,
especially 51F15, and 82D25]
20H20 Other matrix groups over fields
20H25 Other matrix groups over rings
20H30 Other matrix groups over finite fields
20H99 None of the above, but in this section
20Jxx Connections with homological algebra and
category theory
20J05 Homological methods in group theory
20J06 Cohomology of groups
20J15 Category of groups
20J99 None of the above, but in this section
20Kxx Abelian groups
20K01 Finite abelian groups
20K10 Torsion groups, primary groups and generalized
primary groups
20K15 Torsion-free groups, finite rank
20K20 Torsion-free groups, infinite rank
20K21 Mixed groups
20K25 Direct sums, direct products, etc.
20K27 Subgroups
20K30 Automorphisms, homomorphisms,
endomorphisms, etc.
20K35 Extensions
20K40 Homological and categorical methods
20K45 Topological methods [See also 22A05, 22B05]
20K99 None of the above, but in this section
20L05 Groupoids (i.e. small categories in which all
morphisms are isomorphisms) {For sets with
a single binary operation, see 20N02; for
topological groupoids, see 22A22, 58H05} 20Mxx Semigroups
20M05 Free semigroups, generators and relations, word
problems
20M07 Varieties of semigroups
20M10 General structure theory
20M11 Radical theory
20M12 Ideal theory
20M14 Commutative semigroups
20M15 Mappings of semigroups
20M17 Regular semigroups
20M18 Inverse semigroups
20M19 Orthodox semigroups
20M20 Semigroups of transformations, etc.
[See also 47D03, 47H20, 54H15]
20M25 Semigroup rings, multiplicative semigroups of
rings [See also 16S36, 16Y60]
20M30 Representation of semigroups; actions of
semigroups on sets
20M35 Semigroups in automata theory, linguistics, etc.
[See also 03D05, 68Q70, 68T50]
20M50 Connections of semigroups with homological
algebra and category theory
20M99 None of the above, but in this section
20Nxx Other generalizations of groups
20N02 Sets with a single binary operation (groupoids)
20N05 Loops, quasigroups [See also 05Bxx]
20N10 Ternary systems (heaps, semiheaps, heapoids,
etc.)
20N15 n-ary systems (n 3)
20N20 Hypergroups
20N25 Fuzzy groups [See also 03E72]
20N99 None of the above, but in this section
20P05 Probabilistic methods in group theory
[See also 60Bxx]
22–XX TOPOLOGICAL GROUPS, LIE GROUPS
{For transformation groups, see 54H15, 57Sxx,
58–XX. For abstract harmonic analysis, see
43–XX} 22–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
22–01 Instructional exposition (textbooks, tutorial
papers, etc.)
22–02 Research exposition (monographs, survey articles)
22–03 Historical (must also be assigned at least one
classification number from Section 01)
22–04 Explicit machine computation and programs (not
the theory of computation or programming)
22–06 Proceedings, conferences, collections, etc.
22Axx Topological and differentiable algebraic
systems {For topological rings and fields, see
12Jxx, 13Jxx, 16W80} 22A05 Structure of general topological groups
22A10 Analysis on general topological groups
22A15 Structure of topological semigroups
22A20 Analysis on topological semigroups
22A22 Topological groupoids (including differentiable
and Lie groupoids) [See also 58H05]
22A25 Representations of general topological groups and
semigroups
22A26 Topological semilattices, lattices and applications
[See also 06B30, 06B35, 06F30]
22A30 Other topological algebraic systems and their
representations
22A99 None of the above, but in this section
22Bxx Locally compact abelian groups (LCA groups)
22B05 General properties and structure of LCA groups
22B10 Structure of group algebras of LCA groups
22B99 None of the above, but in this section
22C05 Compact groups
22Dxx Locally compact groups and their algebras
22D05 General properties and structure of locally
compact groups
22D10 Unitary representations of locally compact groups
22D12 Other representations of locally compact groups
22D15 Group algebras of locally compact groups
22D20 Representations of group algebras
MATHEMATICS SUBJECT CLASSIFICATION 2000 21 26Bxx
22D25 C-algebras and W*-algebras in relation to group
representations [See also 46Lxx]
22D30 Induced representations
22D35 Duality theorems
22D40 Ergodic theory on groups [See also 28Dxx]
22D45 Automorphism groups of locally compact groups
22D99 None of the above, but in this section
22Exx Lie groups {For the topology of Lie groups
and homogeneous spaces, see 57Sxx, 57Txx;
for analysis thereon, see 43A80, 43A85, 43A90} 22E05 Local Lie groups [See also 34–XX, 35–XX,
58H05]
22E10 General properties and structure of complex Lie
groups [See also 32M05]
22E15 General properties and structure of real Lie
groups
22E20 General properties and structure of other Lie
groups
22E25 Nilpotent and solvable Lie groups
22E27 Representations of nilpotent and solvable Lie
groups (special orbital integrals, non-type I
representations, etc.)
22E30 Analysis on real and complex Lie groups
[See also 33C80, 43–XX]
22E35 Analysis on p-adic Lie groups
22E40 Discrete subgroups of Lie groups
[See also 20Hxx, 32Nxx]
22E41 Continuous cohomology [See also 57R32, 57Txx,
58H10]
22E43 Structure and representation of the Lorentz group
22E45 Representations of Lie and linear algebraic
groups over real fields: analytic methods {For
the purely algebraic theory, see 20G05} 22E46 Semisimple Lie groups and their representations
22E47 Representations of Lie and real algebraic
groups: algebraic methods (Verma modules, etc.)
[See also 17B10]
22E50 Representations of Lie and linear algebraic
groups over local fields [See also 20G05]
22E55 Representations of Lie and linear algebraic
groups over global fields and ad`ele rings
[See also 20G05]
22E60 Lie algebras of Lie groups {For the algebraic
theory of Lie algebras, see 17Bxx} 22E65 Infinite-dimensional Lie groups and their Lie
algebras [See also 17B65, 58B25, 58H05]
22E67 Loop groups and related constructions, grouptheoretic
treatment [See also 58D05]
22E70 Applications of Lie groups to physics; explicit
representations [See also 81R05, 81R10]
22E99 None of the above, but in this section
22Fxx Noncompact transformation groups
22F05 General theory of group and pseudogroup actions
{For topological properties of spaces with an
action, see 57S20} 22F10 Measurable group actions [See also 22D40,
28Dxx, 37Axx]
22F30 Homogeneous spaces {For general actions on
manifolds or preserving geometrical structures,
see 57M60, 57Sxx; for discrete subgroups of Lie
groups see especially 22E40} 22F50 Groups as automorphisms of other structures
26–XX REAL FUNCTIONS [See also 54C30]
26–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
26–01 Instructional exposition (textbooks, tutorial
papers, etc.)
26–02 Research exposition (monographs, survey articles)
26–03 Historical (must also be assigned at least one
classification number from Section 01)
26–04 Explicit machine computation and programs (not
the theory of computation or programming)
26–06 Proceedings, conferences, collections, etc.
26Axx Functions of one variable
26A03 Foundations: limits and generalizations,
elementary topology of the line
26A06 One-variable calculus
26A09 Elementary functions
26A12 Rate of growth of functions, orders of infinity,
slowly varying functions [See also 26A48]
26A15 Continuity and related questions (modulus
of continuity, semicontinuity, discontinuities,
etc.) {For properties determined by Fourier
coefficients, see 42A16; for those determined by
approximation properties, see 41A25, 41A27} 26A16 Lipschitz (H¨older) classes
26A18 Iteration [See also 37Bxx, 37Cxx, 37Exx, 39B12,
47H10, 54H25]
26A21 Classification of real functions; Baire
classification of sets and functions
[See also 03E15, 28A05, 54C50]
26A24 Differentiation (functions of one variable):
general theory, generalized derivatives, meanvalue
theorems [See also 28A15]
26A27 Nondifferentiability (nondifferentiable functions,
points of nondifferentiability), discontinuous
derivatives
26A30 Singular functions, Cantor functions, functions
with other special properties
26A33 Fractional derivatives and integrals
26A36 Antidifferentiation
26A39 Denjoy and Perron integrals, other special
integrals
26A42 Integrals of Riemann, Stieltjes and Lebesgue type
[See also 28–XX]
26A45 Functions of bounded variation, generalizations
26A46 Absolutely continuous functions
26A48 Monotonic functions, generalizations
26A51 Convexity, generalizations
26A99 None of the above, but in this section
26Bxx Functions of several variables
26B05 Continuity and differentiation questions
26B10 Implicit function theorems, Jacobians,
transformations with several variables
MATHEMATICS SUBJECT CLASSIFICATION 2000 26Bxx 22
26B12 Calculus of vector functions
26B15 Integration: length, area, volume
[See also 28A75, 51M25]
26B20 Integral formulas (Stokes, Gauss, Green, etc.)
26B25 Convexity, generalizations
26B30 Absolutely continuous functions, functions of
bounded variation
26B35 Special properties of functions of several
variables, H¨older conditions, etc.
26B40 Representation and superposition of functions
26B99 None of the above, but in this section
26Cxx Polynomials, rational functions
26C05 Polynomials: analytic properties, etc.
[See also 12Dxx, 12Exx]
26C10 Polynomials: location of zeros [See also 12D10,
30C15, 65H05]
26C15 Rational functions [See also 14Pxx]
26C99 None of the above, but in this section
26Dxx Inequalities {For maximal function
inequalities, see 42B25; for functional
inequalities, see 39B72; for probabilistic
inequalities, see 60E15} 26D05 Inequalities for trigonometric functions and
polynomials
26D07 Inequalities involving other types of functions
26D10 Inequalities involving derivatives and differential
and integral operators
26D15 Inequalities for sums, series and integrals
26D20 Other analytical inequalities
26D99 None of the above, but in this section
26Exx Miscellaneous topics [See also 58Cxx]
26E05 Real-analytic functions [See also 32B05, 32C05]
26E10 C1-functions, quasi-analytic functions
[See also 58C25]
26E15 Calculus of functions on infinite-dimensional
spaces [See also 46G05, 58Cxx]
26E20 Calculus of functions taking values in infinitedimensional
spaces [See also 46E40, 46G10,
58Cxx]
26E25 Set-valued functions [See also 28B20, 54C60]
{For nonsmooth analysis, see 49J52, 58Cxx,
90Cxx} 26E30 Non-Archimedean analysis [See also 12J25]
26E35 Nonstandard analysis [See also 03H05, 28E05,
54J05]
26E40 Constructive real analysis [See also 03F60]
26E50 Fuzzy real analysis [See also 03E72, 28E10]
26E60 Means [See also 47A64]
26E99 None of the above, but in this section
28–XX MEASURE AND INTEGRATION {For
analysis on manifolds, see 58–XX} 28–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
28–01 Instructional exposition (textbooks, tutorial
papers, etc.)
28–02 Research exposition (monographs, survey articles)
28–03 Historical (must also be assigned at least one
classification number from Section 01)
28–04 Explicit machine computation and programs (not
the theory of computation or programming)
28–06 Proceedings, conferences, collections, etc.
28Axx Classical measure theory
28A05 Classes of sets (Borel fields, -rings, etc.),
measurable sets, Suslin sets, analytic sets
[See also 03E15, 26A21, 54H05]
28A10 Real- or complex-valued set functions
28A12 Contents, measures, outer measures, capacities
28A15 Abstract differentiation theory, differentiation of
set functions [See also 26A24]
28A20 Measurable and nonmeasurable functions,
sequences of measurable functions, modes of
convergence
28A25 Integration with respect to measures and other set
functions
28A33 Spaces of measures, convergence of measures
[See also 46E27, 60Bxx]
28A35 Measures and integrals in product spaces
28A50 Integration and disintegration of measures
28A51 Lifting theory [See also 46G15]
28A60 Measures on Boolean rings, measure algebras
[See also 54H10]
28A75 Length, area, volume, other geometric measure
theory [See also 26B15, 49Q15]
28A78 Hausdorff and packing measures
28A80 Fractals [See also 37Fxx]
28A99 None of the above, but in this section
28Bxx Set functions, measures and integrals with
values in abstract spaces
28B05 Vector-valued set functions, measures and
integrals [See also 46G10]
28B10 Group- or semigroup-valued set functions,
measures and integrals
28B15 Set functions, measures and integrals with values
in ordered spaces
28B20 Set-valued set functions and measures; integration
of set-valued functions; measurable selections
[See also 26E25, 54C60, 54C65, 91B14]
28B99 None of the above, but in this section
28Cxx Set functions and measures on spaces with
additional structure [See also 46G12, 58C35,
58D20]
28C05 Integration theory via linear functionals (Radon
measures, Daniell integrals, etc.), representing set
functions and measures
28C10 Set functions and measures on topological
groups, Haar measures, invariant measures
[See also 22Axx, 43A05]
28C15 Set functions and measures on topological spaces
(regularity of measures, etc.)
28C20 Set functions and measures and integrals in
infinite-dimensional spaces (Wiener measure,
Gaussian measure, etc.) [See also 46G12, 58C35,
58D20, 60B11]
28C99 None of the above, but in this section
MATHEMATICS SUBJECT CLASSIFICATION 2000 23 30Fxx
28Dxx Measure-theoretic ergodic theory
[See also 11K50, 11K55, 22D40, 37Axx, 47A35,
54H20, 60Fxx, 60G10]
28D05 Measure-preserving transformations
28D10 One-parameter continuous families of measurepreserving
transformations
28D15 General groups of measure-preserving
transformations
28D20 Entropy and other invariants
28D99 None of the above, but in this section
28Exx Miscellaneous topics in measure theory
28E05 Nonstandard measure theory [See also 03H05,
26E35]
28E10 Fuzzy measure theory [See also 03E72, 26E50,
94D05]
28E15 Other connections with logic and set theory
28E99 None of the above, but in this section
30–XX FUNCTIONS OF A COMPLEX VARIABLE
{For analysis on manifolds, see 58–XX} 30–00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
30–01 Instructional exposition (textbooks, tutorial
papers, etc.)
30–02 Research exposition (monographs, survey articles)
30–03 Historical (must also be assigned at least one
classification number from Section 01)
30–04 Explicit machine computation and programs (not
the theory of computation or programming)
30–06 Proceedings, conferences, collections, etc.
30Axx General properties
30A05 Monogenic properties of complex functions
(including polygenic and areolar monogenic
functions)
30A10 Inequalities in the complex domain
30A99 None of the above, but in this section
30Bxx Series expansions
30B10 Power series (including lacunary series)
30B20 Random power series
30B30 Boundary behavior of power series, overconvergence
30B40 Analytic continuation
30B50 Dirichlet series and other series expansions,
exponential series [See also 11M41, 42–XX]
30B60 Completeness problems, closure of a system of
functions
30B70 Continued fractions [See also 11A55, 40A15]
30B99 None of the above, but in this section
30Cxx Geometric function theory
30C10 Polynomials
30C15 Zeros of polynomials, rational functions, and
other analytic functions (e.g. zeros of functions
with bounded Dirichlet integral) {For algebraic
theory, see 12D10; for real methods, see 26C10} 30C20 Conformal mappings of special domains
30C25 Covering theorems in conformal mapping theory
30C30 Numerical methods in conformal mapping theory
[See also 65E05]
30C35 General theory of conformal mappings
30C40 Kernel functions and applications
30C45 Special classes of univalent and multivalent
functions (starlike, convex, bounded rotation, etc.)
30C50 Coefficient problems for univalent and multivalent
functions
30C55 General theory of univalent and multivalent
functions
30C62 Quasiconformal mappings in the plane
30C65 Quasiconformal mappings in Rn, other
generalizations
30C70 Extremal problems for conformal and
quasiconformal mappings, variational methods
30C75 Extremal problems for conformal and
quasiconformal mappings, other methods
30C80 Maximum principle; Schwarz’s lemma, Lindel¨of
principle, analogues and generalizations;
subordination
30C85 Capacity and harmonic measure in the complex
plane [See also 31A15]
30C99 None of the above, but in this section
30Dxx Entire and meromorphic functions, and related
topics
30D05 Functional equations in the complex domain,
iteration and composition of analytic functions
[See also 34Mxx, 37Fxx, 39–XX]
30D10 Representations of entire functions by series and
integrals
30D15 Special classes of entire functions and growth
estimates
30D20 Entire functions, general theory
30D30 Meromorphic functions, general theory
30D35 Distribution of values, Nevanlinna theory
30D40 Cluster sets, prime ends, boundary behavior
30D45 Bloch functions, normal functions, normal
families
30D50 Blaschke products, bounded mean oscillation,
bounded characteristic, bounded functions,
functions with positive real part
30D55 Hp-classes
30D60 Quasi-analytic and other classes of functions
30D99 None of the above, but in this section
30Exx Miscellaneous topics of analysis in the complex
domain
30E05 Moment problems, interpolation problems
30E10 Approximation in the complex domain
30E15 Asymptotic representations in the complex
domain
30E20 Integration, integrals of Cauchy type,
integral representations of analytic functions
[See also 45Exx]
30E25 Boundary value problems [See also 45Exx]
30E99 None of the above, but in this section
30Fxx Riemann surfaces
30F10 Compact Riemann surfaces and uniformization
[See also 14H15, 32G15]
30F15 Harmonic functions on Riemann surfaces
30F20 Classification theory of Riemann surfaces
MATHEMATICS SUBJECT CLASSIFICATION 2000 30Fxx 24
30F25 Ideal boundary theory
30F30 Differentials on Riemann surfaces
30F35 Fuchsian groups and automorphic functions
[See also 11Fxx, 20H10, 22E40, 32Gxx, 32Nxx]
30F40 Kleinian groups [See also 20H10]
30F45 Conformal metrics (hyperbolic, Poincar¢¥e, distance
functions)
30F50 Klein surfaces
30F60 Teichm¡§uller theory [See also 32G15]
30F99 None of the above, but in this section
30Gxx Generalized function theory
30G06 Non-Archimedean function theory
[See also 12J25]; nonstandard function theory
[See also 03H05]
30G12 Finely holomorphic functions and topological
function theory
30G20 Generalizations of Bers or Vekua type
(pseudoanalytic, p-analytic, etc.)
30G25 Discrete analytic functions
30G30 Other generalizations of analytic functions
(including abstract-valued functions)
30G35 Functions of hypercomplex variables and
generalized variables
30G99 None of the above, but in this section
30H05 Spaces and algebras of analytic functions
[See also 32A38, 46Exx, 46J15]
31¡©XX POTENTIAL THEORY {For probabilistic
potential theory, see 60J45} 31¡©00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
31¡©01 Instructional exposition (textbooks, tutorial
papers, etc.)
31¡©02 Research exposition (monographs, survey articles)
31¡©03 Historical (must also be assigned at least one
classification number from Section 01)
31¡©04 Explicit machine computation and programs (not
the theory of computation or programming)
31¡©06 Proceedings, conferences, collections, etc.
31Axx Two-dimensional theory
31A05 Harmonic, subharmonic, superharmonic functions
31A10 Integral representations, integral operators,
integral equations methods
31A15 Potentials and capacity, harmonic measure,
extremal length [See also 30C85]
31A20 Boundary behavior (theorems of Fatou type, etc.)
31A25 Boundary value and inverse problems
31A30 Biharmonic, polyharmonic functions and
equations, Poisson¡¯s equation
31A35 Connections with differential equations
31A99 None of the above, but in this section
31Bxx Higher-dimensional theory
31B05 Harmonic, subharmonic, superharmonic functions
31B10 Integral representations, integral operators,
integral equations methods
31B15 Potentials and capacities, extremal length
31B20 Boundary value and inverse problems
31B25 Boundary behavior
31B30 Biharmonic and polyharmonic equations and
functions
31B35 Connections with differential equations
31B99 None of the above, but in this section
31Cxx Other generalizations
31C05 Harmonic, subharmonic, superharmonic functions
31C10 Pluriharmonic and plurisubharmonic functions
[See also 32U05]
31C12 Potential theory on Riemannian manifolds
[See also 53C20; for Hodge theory, see 58A14]
31C15 Potentials and capacities
31C20 Discrete potential theory and numerical methods
31C25 Dirichlet spaces
31C35 Martin boundary theory [See also 60J50]
31C40 Fine potential theory
31C45 Other generalizations (nonlinear potential theory,
etc.)
31C99 None of the above, but in this section
31D05 Axiomatic potential theory
32¡©XX SEVERAL COMPLEX VARIABLES AND
ANALYTIC SPACES {For infinite-dimensional
holomorphy, see 46G20, 58B12} 32¡©00 General reference works (handbooks, dictionaries,
bibliographies, etc.)
32¡©01 Instructional exposition (textbooks, tutorial
papers, etc.)
32¡©02 Research exposition (monographs, survey articles)
32¡©03 Historical (must also be assigned at least one
classification number from Section 01)
32¡©04 Explicit machine computation and programs (not
the theory of computation or programming)
32¡©06 Proceedings, conferences, collections, etc.
32Axx Holomorphic functions of several complex
variables
32A05 Power series, series of functions
32A07 Special domains (Reinhardt, Hartogs, circular,
tube)
32A10 Holomorphic functions
32A12 Multifunctions
32A15 Entire functions
32A17 Special families of functions
32A18 Bloch functions, normal functions
32A19 Normal families of functions, mappings
32A20 Meromorphic functions
32A22 Nevanlinna theory (local); growth estimates; other
inequalities {For geometric theory, see 32H25,
32H30} 32A25 Integral representations; canonical kernels (Szeg¢©o,
Bergman, etc.)
32A26 Integral representations, constructed kernels (e.g.
Cauchy, Fantappi`e-type kernels)
32A27 Local theory of residues [See also 32C30]
32A30 Other generalizations of function theory of one
complex variable (should also be assigned at least
one classification number from Section 30) {For
functions of several hypercomplex variables, see
30G35}
MATHEMATICS SUBJECT CLASSIFICATION 2000 25 32Jxx
32A35 Hp-spaces, Nevanlinna spaces [See also 32M15,
42B30, 43A85, 46J15]
32A36 Bergman spaces
32A37 Other spaces of holomorphic functions (e.g.
bounded mean oscillation (BMOA), vanishing
mean oscillation (VMOA)) [See also 46Exx]
32A38 Algebras of holomorphic functions
[See also 30H05, 46J10, 46J15]
32A40 Boundary behavior of holomorphic functions
32A45 Hyperfunctions [See also 46F15]
32A50 Harmonic analysis of several complex variables
[See mainly 43¡©XX]
32A55 Singular integrals
32A60 Zero sets of holomorphic functions
32A65 Banach algebra techniques [See mainly 46Jxx]
32A70 Functional analysis techniques
[See mainly 46Exx]
32A99 None of the above, but in this section
32Bxx Local analytic geometry [See also 13¡©XX and
14¡©XX]
32B05 Analytic algebras and generalizations, preparation
theorems
32B10 Germs of analytic sets, local parametrization
32B15 Analytic subsets of affine space
32B20 Semi-analytic sets and subanalytic sets
[See also 14P15]
32B25 Triangulation and related questions
32B99 None of the above, but in this section
32Cxx Analytic spaces
32C05 Real-analytic manifolds, real-analytic spaces
[See also 14Pxx, 58A07]
32C07 Real-analytic sets, complex Nash functions
[See also 14P15, 14P20]
32C09 Embedding of real analytic manifolds
32C11 Complex supergeometry [See also 14A22,
14M30, 58A50]
32C15 Complex spaces
32C18 Topology of analytic spaces
32C20 Normal analytic spaces
32C22 Embedding of analytic spaces
32C25 Analytic subsets and submanifolds
32C30 Integration on analytic sets and spaces, currents
{For local theory, see 32A25 or 32A27} 32C35 Analytic sheaves and cohomology groups
[See also 14Fxx, 18F20, 55N30]
32C36 Local cohomology of analytic spaces
32C37 Duality theorems
32C38 Sheaves of differential operators and their
modules, D-modules [See also 14F10, 16S32,
35A27, 58J15]
32C55 The Levi problem in complex spaces;
generalizations
32C81 Applications to physics
32C99 None of the above, but in this section
32Dxx Analytic continuation
32D05 Domains of holomorphy
32D10 Envelopes of holomorphy
32D15 Continuation of analytic objects
32D20 Removable singularities
32D26 Riemann domains
32D99 None of the above, but in this section
32Exx Holomorphic convexity
32E05 Holomorphically convex complex spaces,
reduction theory
32E10 Stein spaces, Stein manifolds
32E20 Polynomial convexity
32E30 Holomorphic and polynomial approximation,
Runge pairs, interpolation
32E35 Global boundary behavior of holomorphic
functions
32E40 The Levi problem
32E99 None of the above, but in this section
32Fxx Geometric convexity
32F10 q-convexity, q-concavity
32F17 Other notions of convexity
32F18 Finite-type conditions
32F27 Topological consequences of geometric convexity
32F32 Analytical consequences of geometric convexity
(vanishing theorems, etc.)
32F45 Invariant metrics and pseudodistances
32F99 None of the above, but in this section
32Gxx Deformations of analytic structures
32G05 Deformations of complex structures
[See also 13D10, 16S80, 58H10, 58H15]
32G07 Deformations of special (e.g. CR) structures
32G08 Deformations of fiber bundles
32G10 Deformations of submanifolds and subspaces
32G13 Analytic moduli problems {For algebraic moduli
problems, see 14D20, 14D22, 14H10, 14J10} [See also 14H15, 14J15]
32G15 Moduli of Riemann surfaces, Teichm¡§uller theory
[See also 14H15, 30Fxx]
32G20 Period matrices, variation of Hodge structure;
degenerations [See also 14D05, 14D07, 14K30]
32G34 Moduli