Defining a Quadratic Form (VECTOR SPACES)
Properties of the Form (VECTOR SPACES)
Quadratic Forms and Inner Products (VECTOR SPACES)
Rings, Fields, and Algebras (OVERVIEW)
quo< F | relations > : AlgFP, Rel, .., Rel -> AlgFP
quo< GrpPC : F | R : parameters > : GrpFP, List(GrpFPRel) -> GrpPC, Map
quo<F | R> : GrpAb, List -> GrpAb, Hom(GrpAb)
quo< F | R > : GrpFP, List -> GrpFP, Hom(Grp)
quo< G | P > : Grph, { { Vert } } -> VertSet, EdgeSet
quo<G | L> : GrpMat, List -> GrpPerm, Map
quo<G | L> : GrpPC, List -> GrpPC, Map
quo<G | L> : GrpPerm, List -> GrpPerm
quo<V | L> : ModTupFld, List -> ModTupFld
quo<M | L> : ModTupRng, List -> ModTupRng
quo< FldNum : R | f > : AlgPol, AlgPolElt -> FldNum
quo< R | a_r, ..., a_r > : Rng, RngElt, ..., RngElt -> Rng
quo< Z | m > : RngInt, RngIntElt -> RngIntRes
quo< R | I > : RngMPol, RngMPol -> RngMPolRes
quo< R | I > : RngUPol, RngUPol -> RngUPolRes
quo< F | relations > : SgpFP, Rel, ..., Rel -> SgpFP
AlgFP_Quotient (Example H39E4)
GrpMat_Quotient (Example H17E8)
GrpPerm_Quotient (Example H16E6)
Construction of a Quotient: Specification of a Presentation (FINITELY PRESENTED GROUPS)
Construction of Quotient Groups (ABELIAN GROUPS)
Construction of Quotient Groups (GROUPS)
Construction of Quotient Groups (MATRIX GROUPS)
Construction of Quotient Groups (PERMUTATION GROUPS)
Construction of Quotient Groups (SOLUBLE GROUPS)
Construction of Quotient Modules (GENERAL MODULES)
Construction of Quotient Vector Spaces (VECTOR SPACES)
Construction of Subalgebras, Ideals and Quotient Rings (MATRIX ALGEBRAS)
Construction of Subgroups and Quotient Groups (ABELIAN GROUPS)
Finite dimensional Quotient Rings (MULTIVARIATE POLYNOMIAL RINGS)
Ideals and Quotient Rings (INTRODUCTION [RINGS AND FIELDS])
Ideals and Quotient Rings (UNIVARIATE POLYNOMIAL RINGS)
Other Functions on Quotients (UNIVARIATE POLYNOMIAL RINGS)
Quotient Rings (MULTIVARIATE POLYNOMIAL RINGS)
Quotients (FINITELY PRESENTED SEMIGROUPS)
Rings, Fields, and Algebras (OVERVIEW)
Subgraphs, Quotient Graphs, and Super-graphs (GRAPHS)
Subgroups, Quotient Groups and Extensions (SOLUBLE GROUPS)
Submodules, Quotient Modules and Homomorphisms (GENERAL MODULES)
Subsemigroups, Ideals and Quotients (FINITELY PRESENTED SEMIGROUPS)
Subspaces, Quotient Spaces and Homomorphisms (VECTOR SPACES)
QuotientModule(A, S) : AlgFP, AlgFP -> AlgFP
QuotientModule(A, S) : AlgFP, AlgFP -> AlgFP
QuotientModule(A, S) : AlgFP, AlgFP -> AlgFP
QuotientModule(A, S) : AlgFP, AlgFP -> AlgFP
QuotientModule(A, S) : AlgFP, AlgFP -> AlgFP
Quotrem(f, g) : RngUPolElt, RngUPolElt -> RngUPolElt, RngUPolElt
Quotrem(v, w) : RngValElt, RngValElt -> RngValElt, RngValElt
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