PrincipalIdealDomain¶

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The category of constructive principal ideal domains, i.e. where a single generator can be constructively found for any ideal given by a finite set of generators. Note that this constructive definition only implies that finitely generated ideals are principal. It is not clear what we would mean by an infinitely generated ideal.

0: %: from AbelianMonoid

1: %: from MagmaWithUnit

*: (%, %) -> %: from Magma
*: (Integer, %) -> %: from AbelianGroup
*: (NonNegativeInteger, %) -> %: from AbelianMonoid
*: (PositiveInteger, %) -> %: from AbelianSemiGroup

+: (%, %) -> %: from AbelianSemiGroup

-: % -> %: from AbelianGroup
-: (%, %) -> %: from AbelianGroup

=: (%, %) -> Boolean: from BasicType

^: (%, NonNegativeInteger) -> %: from MagmaWithUnit
^: (%, PositiveInteger) -> %: from Magma

~=: (%, %) -> Boolean: from BasicType

annihilate?: (%, %) -> Boolean: from Rng

antiCommutator: (%, %) -> %: from NonAssociativeSemiRng

associates?: (%, %) -> Boolean: from EntireRing

associator: (%, %, %) -> %: from NonAssociativeRng

characteristic: () -> NonNegativeInteger: from NonAssociativeRing

coerce: % -> %: from Algebra %
coerce: % -> OutputForm: from CoercibleTo OutputForm
coerce: Integer -> %: from NonAssociativeRing

commutator: (%, %) -> %: from NonAssociativeRng

expressIdealMember: (List %, %) -> Union(List %, failed): expressIdealMember([f1, ..., fn], h) returns a representation of h as a linear combination of the fi or “failed” if h is not in the ideal generated by the fi.

exquo: (%, %) -> Union(%, failed): from EntireRing

gcd: (%, %) -> %: from GcdDomain
gcd: List % -> %: from GcdDomain

gcdPolynomial: (SparseUnivariatePolynomial %, SparseUnivariatePolynomial %) -> SparseUnivariatePolynomial %: from GcdDomain

latex: % -> String: from SetCategory

lcm: (%, %) -> %: from GcdDomain
lcm: List % -> %: from GcdDomain

lcmCoef: (%, %) -> Record(llcm_res: %, coeff1: %, coeff2: %): from LeftOreRing

leftPower: (%, NonNegativeInteger) -> %: from MagmaWithUnit
leftPower: (%, PositiveInteger) -> %: from Magma

leftRecip: % -> Union(%, failed): from MagmaWithUnit

one?: % -> Boolean: from MagmaWithUnit

opposite?: (%, %) -> Boolean: from AbelianMonoid

plenaryPower: (%, PositiveInteger) -> %: from NonAssociativeAlgebra %

principalIdeal: List % -> Record(coef: List %, generator: %): principalIdeal([f1, ..., fn]) returns a record whose generator component is a generator of the ideal generated by [f1, ..., fn] whose coef component satisfies generator = sum (input.i * coef.i)