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Subindex: gcd  ..    GeneralLinearGroup




gcd

   Common Divisors and Common Multiples (MULTIVARIATE POLYNOMIAL RINGS)

   Common Divisors and Common Multiples (RING OF INTEGERS)

   Common Divisors and Common Multiples (UNIVARIATE POLYNOMIAL RINGS)

   RngLoc_gcd (Example H59E15)


gcd-lcm

   Common Divisors and Common Multiples (MULTIVARIATE POLYNOMIAL RINGS)

   Common Divisors and Common Multiples (RING OF INTEGERS)

   Common Divisors and Common Multiples (UNIVARIATE POLYNOMIAL RINGS)


GCDs

   Greatest Common Right and Left Divisors (DIFFERENTIAL RINGS, FIELDS AND OPERATORS)


GE

   IsGE(u, v: parameters) : GrpBrdElt, GrpBrdElt -> BoolElt

   IsGe(u, v: parameters) : GrpBrdElt, GrpBrdElt -> BoolElt

   u >= v : GrpBrdElt, GrpBrdElt -> BoolElt


Ge

   IsGE(u, v: parameters) : GrpBrdElt, GrpBrdElt -> BoolElt

   IsGe(u, v: parameters) : GrpBrdElt, GrpBrdElt -> BoolElt

   u >= v : GrpBrdElt, GrpBrdElt -> BoolElt


ge

   Comparison (OVERVIEW)

   u >= v : GrpBrdElt, GrpBrdElt -> BoolElt

   u ge v : GrpFPElt, GrpFPElt -> BoolElt

   s ge t : MonStgElt, MonStgElt -> BoolElt

   a ge b : RngElt, RngElt -> BoolElt

   S ge T : SeqEnum, SeqEnum -> BoolElt

   u ge v : SgpFPElt, SgpFPElt -> BoolElt

   e ge f : SubGrpLatElt, SubGrpLatElt -> BoolElt

   e ge f : SubGrpLatElt, SubGrpLatElt -> BoolElt


Gegenbauer

   GegenbauerPolynomial(n, m) : RngIntElt, RngElt ->RngUPolElt


GegenbauerPolynomial

   GegenbauerPolynomial(n, m) : RngIntElt, RngElt ->RngUPolElt


gen

   General Vertex and Edge Connectivity in Graphs and Digraphs (GRAPHS)

   General Vertex and Edge Connectivity in Multigraphs and Multidigraphs (MULTIGRAPHS)

   Updating the Databases (HADAMARD MATRICES)


gen-connectivity

   General Vertex and Edge Connectivity in Graphs and Digraphs (GRAPHS)


Genera

   LocalGenera(G) : SymGen -> Lat

   SpinorGenera(G) : SymGen -> [ SymGen ]


General

   AGL(arguments)

   AffineGeneralLinearGroup(arguments)

   AffineGeneralLinearGroup(GrpMat, n, q) : Cat, RngIntElt, RngIntElt -> GrpMat

   GeneralLinearGroup(n, R) : RngIntElt, Rng -> GrpMat

   GeneralLinearGroup(n, q) : RngIntElt, RngIntElt -> GrpMat

   GeneralOrthogonalGroup(n, q) : RngIntElt, RngIntElt -> GrpMat

   GeneralOrthogonalGroupMinus(n, q) : RngIntElt, RngIntElt -> GrpMat

   GeneralOrthogonalGroupPlus(n, q) : RngIntElt, RngIntElt -> GrpMat

   GeneralUnitaryGroup(n, q) : RngIntElt, RngIntElt -> GrpMat

   PGO(arguments)

   PGOMinus(arguments)

   PGOPlus(arguments)

   ProjectiveGeneralLinearGroup(arguments)

   ProjectiveGeneralUnitaryGroup(arguments)


general

   Constructing a General L-Series (L-FUNCTIONS)

   Constructing a General Matrix Algebra (MATRIX ALGEBRAS)

   Construction of a General Group (GROUPS)

   Construction of a General Matrix  Group (MATRIX GROUPS OVER GENERAL RINGS)

   Construction of a General Permutation Group (PERMUTATION GROUPS)

   Construction of General Additive Codes (ADDITIVE CODES)

   Construction of General Linear  Codes (LINEAR CODES OVER FINITE FIELDS)

   Construction of General Linear  Codes (LINEAR CODES OVER FINITE RINGS)

   Construction of General Quantum Codes (QUANTUM CODES)

   Creation of a Matrix Group (MATRIX GROUPS OVER GENERAL RINGS)

   FREE MODULES

   General Constructions (MODULES OVER AN ALGEBRA)

   General Factorization (RING OF INTEGERS)

   General Function Field Places (ALGEBRAIC FUNCTION FIELDS)

   General function fields (ALGEBRAIC FUNCTION FIELDS)

   General Functions (ORDERS AND ALGEBRAIC FIELDS)

   General L-series (L-FUNCTIONS)

   Generalized Attacks (LINEAR CODES OVER FINITE FIELDS)

   K[G]-MODULES AND GROUP REPRESENTATIONS

   MODULES OVER AN ALGEBRA

   Presentations (FINITELY PRESENTED SEMIGROUPS)


general-magma

   Constructing a General Matrix Algebra (MATRIX ALGEBRAS)

   Presentations (FINITELY PRESENTED SEMIGROUPS)


general-mceliece

   Generalized Attacks (LINEAR CODES OVER FINITE FIELDS)


general-module-constructions

   General Constructions (MODULES OVER AN ALGEBRA)


Generalised

   GeneralisedRowReduction(rho) : GrpLie, Map -> Map


GeneralisedRowReduction

   GeneralisedRowReduction(rho) : GrpLie, Map -> Map


Generalized

   GeneralizedFibonacciNumber(g0, g1, n) : RngIntElt, RngIntElt, RngIntElt							-> RngIntElt

   GeneralizedFibonacciNumber(g0, g1, n) : RngIntElt, RngIntElt, RngIntElt -> RngIntElt

   GeneralizedSrivastavaCode(A, W, Z, t, S) : [ FldFinElt ], [ FldFinElt ], [ FldFinElt ], RngIntElt, FldFin -> Code

   IsGeneralizedCharacter(x) : AlgChtrElt -> BoolElt


GeneralizedFibonacciNumber

   GeneralizedFibonacciNumber(g0, g1, n) : RngIntElt, RngIntElt, RngIntElt							-> RngIntElt

   GeneralizedFibonacciNumber(g0, g1, n) : RngIntElt, RngIntElt, RngIntElt -> RngIntElt


GeneralizedSrivastavaCode

   GeneralizedSrivastavaCode(A, W, Z, t, S) : [ FldFinElt ], [ FldFinElt ], [ FldFinElt ], RngIntElt, FldFin -> Code


GeneralLinearGroup

   GL(n, R) : RngIntElt, Rng -> GrpMat

   GeneralLinearGroup(n, R) : RngIntElt, Rng -> GrpMat

   GeneralLinearGroup(n, q) : RngIntElt, RngIntElt -> GrpMat




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