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General Rings, Ideals, and Morphisms
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General Rings, Ideals, and Morphisms
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Rings
Ideals of commutative rings.
Monoid of ideals in a commutative ring
Generic implementation of one- and two-sided ideals of non-commutative rings.
Homomorphisms of rings
Space of homomorphisms between two rings
Infinity Rings
Fraction Field of Integral Domains
Fraction Field Elements
Univariate rational functions over prime fields
Quotient Rings
Quotient Ring Elements
Classical Invariant Theory
C-Finite Sequences
Cython wrapper for bernmm library
Bernoulli numbers modulo p
Big O for various types (power series, p-adics, etc.)
Continued fraction field
Integer factorization functions
Basic arithmetic with c-integers.
Miscellaneous utilities
Monomials
Abstract base class for commutative algebras
Base class for commutative algebra elements
Abstract base class for commutative rings
Base class for commutative ring elements
Base class for Dedekind domains
Base class for Dedekind domain elements
Abstract base class for Euclidean domains
Base class for Euclidean domain elements
Abstract base class for fields
Base class for field elements
Abstract base class for integral domains
Base class for integral domain elements
Abstract base class for principal ideal domains
Base class for principal ideal domain elements
Base class for ring elements
Indices and Tables
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Index
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Sage Reference Manual
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General Rings, Ideals, and Morphisms
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