Index H

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Index H

h

Overview (OVERVIEW)

H-key

h

h-key

h

hadamard

Hadamard Matrices and their 3-Designs (INCIDENCE STRUCTURES AND DESIGNS)

Design_hadamard (Example H42E5)

HadamardColumnDesign

HadamardColumnDesign(H, i) : AlgMatElt, RngIntElt -> Dsgn

HadamardRowDesign

HadamardRowDesign(H, i) : AlgMatElt, RngIntElt -> Dsgn

Hall

Hall pi-Subgroups and Sylow Systems (SOLUBLE GROUPS)

GrpPC_Hall (Example H15E4)

Hall-pi-Sylow

Hall pi-Subgroups and Sylow Systems (SOLUBLE GROUPS)

HallSubgroup

HallSubgroup(G, S) : GrpPC, { RngIntElt } -> GrpPC

Hamming

Construction of Standard Linear Codes (ERROR-CORRECTING CODES)

Hamming-Reed-Muller

Construction of Standard Linear Codes (ERROR-CORRECTING CODES)

HammingCode

HammingCode(K, r) : FldFin, RngIntElt -> Code

Code_HammingCode (Example H44E4)

HasAttribute

HasAttribute(FldFin, "PowerPrinting") : Cat, MonStgElt -> BoolElt, BoolElt

HasAttribute(FldPr, "Precision") : Cat, MonStgElt -> BoolElt, RngIntElt

HasAttribute(R, "Precision") : FldPow, MonStgElt -> BoolElt, RngIntElt

HasAttribute(G, "Order") : GrpMat, MonStgElt -> RngIntElt

HasComplement

HasComplement(M, S) : ModGrp, ModGrp -> BoolElt, ModGrp

Hash

Hash(x) : Elt -> RngIntElt

Height

Height(P) : GeomECElt -> FldPrElt

height

Height (ELLIPTIC CURVES)

HeightPairing

HeightPairing(P, Q) : GeomECElt, GeomECElt -> FldPrElt

help

Overview (OVERVIEW)

Hensel

RngPol_Hensel (Example H24E4)

hensel

Hensel Lifting (UNIVARIATE POLYNOMIAL RINGS)

HenselLift

HenselLift(f, s, P) : RngUPolElt, [ RngUPolElt ], RngRes -> [ RngUPolElt ]

HermiteForm

HermiteForm(a) : AlgMatElt -> AlgMatElt, AlgMatElt

HermiteForm(a) : ModMatRngElt -> ModMatRngElt, ModMatRngElt

Heron

RngMPol_Heron (Example H25E8)

Hessian

GrpPerm_Hessian (Example H16E4)

Hilbert

RngMPol_Hilbert (Example H25E21)

hilbert

Dimension, Hilbert Series and Hilbert Polynomial (MULTIVARIATE POLYNOMIAL RINGS)

HilbertPolynomial

HilbertPolynomial(M) : RngMPol -> RngUPolElt, RngIntElt

HilbertSeries

HilbertSeries(I) : RngMPol -> FldFunUElt

history

History (OVERVIEW)

History (SYSTEM FEATURES)

Magma Updates (OVERVIEW)

HN

GrpFP_HN (Example H14E17)

Hom

Hom(M, N) : ModRng, ModRng -> ModMatRng

Hom(V, W) : ModTupFld, ModTupFld -> ModMat

Hom(M, N) : ModTupRng, ModTupRng -> ModMatRng

hom

Homomorphisms (OVERVIEW)

hom< A -> B | f > : AlgMat, AlgMat, Map -> Map

hom< F -> G | x > : FldFin, Rng -> Map

hom< K -> R | r > : FldNum, Rng, RngElt -> HomFld

hom< G -> H | L > : Grp, Grp -> Map

hom< M -> N | X > : ModRng, ModRng, ModMatElt -> ModMatRng

hom< Z -> R | > : RngInt, Rng -> Map

hom< R -> S | > : RngIntRes, Rng -> Map

hom< P -> S | f, y_1, ..., y_n > : RngMPol, Rng -> Map

hom< Q -> F | f > : RngQuad, Rng, RngElt -> Map

hom< P -> S | f, y > : RngUPol, Rng, Map, RngElt -> Map

hom< A -> B | G > : Struct, Struct -> Map

FldQuad_hom (Example H28E1)

RngInt_hom (Example H21E1)

homomomorphism

Homomorphisms (MAPPINGS)

Homomorphism

RngMPol_Homomorphism (Example H25E1)

RngPol_Homomorphism (Example H24E1)

homomorphism

Coset Spaces: Induced Homomorphism (FINITELY PRESENTED GROUPS)

Creation of Homomorphisms (MAPPINGS)

Elements of M_n as Homomorphisms (MATRIX ALGEBRAS)

Homomorphisms (FINITE FIELDS)

Homomorphisms (GROUPS)

Homomorphisms (LOCAL FIELDS)

Homomorphisms (MULTIVARIATE POLYNOMIAL RINGS)

Homomorphisms (NUMBER FIELDS AND THEIR ORDERS)

Homomorphisms (OVERVIEW)

Homomorphisms (POWER SERIES AND LAURENT SERIES)

Homomorphisms (QUADRATIC FIELDS)

Homomorphisms (RATIONAL FIELD)

Homomorphisms (REAL AND COMPLEX FIELDS)

Homomorphisms (RESIDUE CLASS RINGS)

Homomorphisms (RING OF INTEGERS)

Homomorphisms (UNIVARIATE POLYNOMIAL RINGS)

Homomorphisms of Modules (GENERAL MODULES)

Modules (OVERVIEW)

Submodules, Quotient Modules and Homomorphisms (GENERAL MODULES)

Subspaces, Quotient Spaces and Homomorphisms (VECTOR SPACES)

The Homomorphism Induced by a G-Set Action (PERMUTATION GROUPS)

THE MODULES Hom_(R)(M, N) AND End(M)

FldRat_homomorphism (Example H20E2)

homomorphism-element

Elements of M_n as Homomorphisms (MATRIX ALGEBRAS)

Homomorphisms

FldNum_Homomorphisms (Example H30E1)

FldRe_Homomorphisms (Example H31E2)

Grp_Homomorphisms (Example H11E1)

hyperbolic

Hyperbolic Functions (REAL AND COMPLEX FIELDS)

Inverse Hyperbolic Functions (REAL AND COMPLEX FIELDS)

Hypercenter

Hypercentre(G) : GrpAb -> GrpAb

Hypercentre(G) : GrpFin -> GrpFin

Hypercentre(G) : GrpPC -> GrpPC

Hypercentre(G) : GrpPerm -> GrpPerm

Hypercentre

Hypercentre(G) : GrpAb -> GrpAb

Hypercentre(G) : GrpFin -> GrpFin

Hypercentre(G) : GrpPC -> GrpPC

Hypercentre(G) : GrpPerm -> GrpPerm

HypergeometricU

HypergeometricU(a, b, s) : FldPrElt, FldPrElt, FldPrElt -> FldPrElt

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