MSCMSC
- [+]00-XXGeneral
- [+]01XXXHistory and Foundations
- [-]06XXXAlgebra
- [+]26XXXAnalysis
- [+]5XXXXGeometry and Topology
- [+]60XXXProbability and Statistics
- [+]65-XXNumerical analysis
- [+]68-XXComputer science
- [+]7XXXXApplications
- [+]97-XXMathematics education
- 06XXXAllgemeines und Nachschlagewerke
- [+]06-XXOrder, lattices, ordered algebraic structures
- [+]08-XXGeneral algebraic systems
- [+]11-XXNumber theory
- [+]12-XXField theory and polynomials
- [+]13-XXCommutative rings and algebras
- [+]14-XXAlgebraic geometry
- [+]15-XXLinear and multilinear algebra; matrix theory
- [+]16-XXAssociative rings and algebras
- [+]17-XXNonassociative rings and algebras
- [-]18-XXCategory theory; homological algebra
- [+]19-XXK-theory
- [+]20-XXGroup theory and generalizations
- [+]22-XXTopological groups, Lie groups
- 18-00General reference works (handbooks, dictionaries, bibliographies, etc.)
- 18-01Instructional exposition (textbooks, tutorial papers, etc.)
- 18-02Research exposition (monographs, survey articles)
- 18-03Historical
- 18-04Explicit machine computation and programs
- 18-06Proceedings, conferences, collections, etc.
- [-]18AXXGeneral theory of categories and functors
- [+]18BXXSpecial categories
- [+]18CXXCategories and theories
- [+]18DXXCategories with structure
- [+]18EXXAbelian categories
- [+]18FXXCategories and geometry
- [+]18GXXHomological algebra
- 18AXXAllgemeines und Nachschlagewerke
- 18A05Definitions, generalizations
- 18A10Graphs, diagram schemes, precategories
- 18A15Foundations, relations to logic and deductive systems
- 18A20Epimorphisms, monomorphisms, special classes of morphisms, null morphisms
- 18A22Special properties of functors (faithful, full, etc.)
- 18A23Natural morphisms, dinatural morphisms
- 18A25Functor categories, comma categories
- 18A30Limits and colimits (products, sums, directed limits, pushouts, fiber products, equalizers, kernels, ends and coends, etc.)
- 18A32Factorization of morphisms, substructures, quotient structures, congruences, amalgams
- 18A35Categories admitting limits (complete categories), functors preserving limits, completions
- 18A40Adjoint functors (universal constructions, reflective subcategories, Kan extensions, etc.)
- 18A99None of the above, but in this section
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