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Subindex: Inc .. indecomposable-projective-modules
Combinatorial and Geometrical Structures (OVERVIEW)
IncidenceDigraph(A) : ModMatRngElt -> GrphDir
IncidenceGeometry(C) : CosetGeom -> IncGeom
IncidenceGeometry(G) : GrphUnd -> IncGeom
IncidenceGraph(D) : Inc -> Grph
IncidenceGraph(D) : Inc -> GrphUnd
IncidenceGraph(D) : IncGeom -> GrphUnd, GrphVertSet, GrphEdgeSet
IncidenceGraph(A) : ModMatRngElt -> GrphUnd
IncidenceGraph(P) : Plane -> Grph
IncidenceGraph(P) : Plane -> GrphUnd
IncidenceMatrix(G) : Grph -> ModHomElt
IncidenceMatrix(D) : Inc -> ModMatRngElt
IncidenceMatrix(P) : Plane -> AlgMatElt
IncidenceStructure(G) : Grph -> Inc
IncidenceStructure(I) : Inc -> Inc
IncidenceStructure< v | X > : RngIntElt, List -> Inc
Combinatorial and Geometrical Structures (OVERVIEW)
Construction of an Incidence Geometry (INCIDENCE GEOMETRY)
HADAMARD MATRICES
INCIDENCE GEOMETRY
INCIDENCE STRUCTURES AND DESIGNS
INCIDENCE GEOMETRY
INCIDENCE STRUCTURES AND DESIGNS
HADAMARD MATRICES
IncidenceDigraph(A) : ModMatRngElt -> GrphDir
Combinatorial and Geometrical Structures (OVERVIEW)
IncidenceGeometry(C) : CosetGeom -> IncGeom
IncidenceGeometry(G) : GrphUnd -> IncGeom
IncidenceGraph(D) : Inc -> Grph
IncidenceGraph(D) : Inc -> GrphUnd
IncidenceGraph(D) : IncGeom -> GrphUnd, GrphVertSet, GrphEdgeSet
IncidenceGraph(A) : ModMatRngElt -> GrphUnd
IncidenceGraph(P) : Plane -> Grph
IncidenceGraph(P) : Plane -> GrphUnd
IncidenceMatrix(G) : Grph -> ModHomElt
IncidenceMatrix(D) : Inc -> ModMatRngElt
IncidenceMatrix(P) : Plane -> AlgMatElt
IncidenceStructure(G) : Grph -> Inc
IncidenceStructure(I) : Inc -> Inc
IncidenceStructure< v | X > : RngIntElt, List -> Inc
IncidentEdges(u) : GrphVert -> SetEnum
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> SetEnum
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
IncidentEdges(u) : GrphVert -> { GrphEdge }
Include(~S, x) : SeqEnum, Elt ->
Include(~S, x) : SetEnum, Elt ->
IncludeAutomorphism(~C, p) : Code, GrpPermElt ->
IncludeWeight(X,w) : GRK3,RngIntElt -> GRK3
IncludeWeight(~X,w) : GRSch,RngIntElt ->
Set_Include (Example H9E10)
IncludeAutomorphism(~C, p) : Code, GrpPermElt ->
IncludeWeight(X,w) : GRK3,RngIntElt -> GRK3
IncludeWeight(~X,w) : GRSch,RngIntElt ->
InclusionMap(G, H) : GrpGPC, GrpGPC -> Map
InclusionMap(G, H) : GrpPC, GrpPC -> Map
Inclusion and Equality (FINITE SOLUBLE GROUPS)
Inclusion and Equality (FINITE SOLUBLE GROUPS)
InclusionMap(G, H) : GrpGPC, GrpGPC -> Map
InclusionMap(G, H) : GrpPC, GrpPC -> Map
NumberOfInclusions(e, f) : SubGrpLatElt, SubGrpLatElt -> RngIntElt
AddEdges(~N, S) : GrphNet, { < [ GrphVert, GrphVert ], RngIntElt > } ->
Incremental Construction: Adding Edges (NETWORKS)
MaximalIncreasingSequence(w) : MonOrdElt -> RngIntElt
MaximalIncreasingSequences(w, k) : SeqEnum,RngIntElt -> RngIntElt
IndecomposableSummands(M) : ModRng -> [ ModRng ]
IsIndecomposable(M,B) : ModBrdt, RngIntElt -> BoolElt
Indecomposable Projective Modules (BASIC ALGEBRAS)
Indecomposable Projective Modules (BASIC ALGEBRAS)
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