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<Chapter Label="chap:demo"> <Heading>A demo session with <Package>simpcomp</Package></Heading>
This chapter contains the transcript of a demo session with <Package>simpcomp</Package> that is i Of course this only scratches the surface of the functions provided by <Package>simpcomp</Packa <Section Label="sec:DemoCreatingCompl"> <Heading>Creating a <C>SCSimplicialComplex</C> object</Heading> Simplicial complex objects can either be created from a facet list (complex <C>c1</C> below), orbi <Log> gap> #first run functionality test on simpcomp gap> SCRunTest(); + test simpcomp package, version 0.0.0 true gap> #all ok gap> c1:=SCFromFacets([[1,2],[2,3],[3,1]]); [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels. Name="unnamed complex 1" Dim=1 /SimplicialComplex] gap> G:=Group([(2,12,11,6,8,3)(4,7,10)(5,9),(1,11,6,4,5,3,10,8,9,7,2,12)]); Group([ (2,12,11,6,8,3)(4,7,10)(5,9), (1,11,6,4,5,3,10,8,9,7,2,12) ]) gap> StructureDescription(G); "S4 x S3" gap> Size(G); 144 gap> c2:=SCFromGenerators(G,[[1,2,3]]);; gap> c2.IsManifold; true gap> SCLibDetermineTopologicalType(c2); [SimplicialComplex Properties known: AutomorphismGroup, AutomorphismGroupSize, AutomorphismGroupStructure, AutomorphismGroupTransitivity,\ Boundary, Dim, Faces, Facets, Generators, HasBoundary, IsManifold, IsPM, Name, TopologicalType, VertexLabels, Vertices. Name="complex from generators under group S4 x S3" Dim=2 AutomorphismGroupSize=144 AutomorphismGroupStructure="S4 x S3" AutomorphismGroupTransitivity=1 HasBoundary=false IsPM=true TopologicalType="T^2" /SimplicialComplex] gap> c3:=SCFromDifferenceCycles([[1,1,6],[3,3,2]]); [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels. Name="complex from diffcycles [ [ 1, 1, 6 ], [ 3, 3, 2 ] ]" Dim=2 /SimplicialComplex] gap> c4:=SCBdSimplex(2); [SimplicialComplex Properties known: AutomorphismGroup, AutomorphismGroupOrder, AutomorphismGroupStructure, AutomorphismGroupTransitivity, Chi, Dim, F, Facets, Generators, HasBounday, Homology, IsConnected, IsStronglyConnected, Name, TopologicalType, VertexLabels. Name="S^1_3" Dim=1 AutomorphismGroupStructure="S3" AutomorphismGroupTransitivity=3 Chi=0 F=[ 3, 3 ] Homology=[ [ 0, [ ] ], [ 1, [ ] ] ] IsConnected=true IsStronglyConnected=true TopologicalType="S^1" /SimplicialComplex] gap> c5:=SCSeriesCSTSurface(2,16);; gap> SCLibDetermineTopologicalType(c5); [SimplicialComplex Properties known: Boundary, Dim, Faces, Facets, HasBoundary, IsPM, Name, TopologicalType, VertexLabels. Name="cst surface S_{(2,16)} = { (2:2:12),(6:6:4) }" Dim=2 HasBoundary=false IsPM=true TopologicalType="T^2 U T^2" /SimplicialComplex] gap> c6:=SCSeriesD2n(22);; gap> c6.Homology; [ [ 0, [ ] ], [ 1, [ ] ], [ 0, [ 2 ] ], [ 0, [ ] ] ] gap> c6.F; [ 44, 264, 440, 220 ] gap> SCSeriesAGL(17); [ AGL(1,17), [ [ 1, 2, 4, 8, 16 ] ] ] gap> c7:=SCFromGenerators(last[1],last[2]);; gap> c7.AutomorphismGroupTransitivity; 2 </Log> </Section> <Section Label="sec:DemoWorkingCompl"> <Heading>Working with a <C>SCSimplicialComplex</C> object</Heading> As described in Section <Ref Sect="sec:AcessSC" /> there are two several ways of accessing an obj The code listed below <Log> gap> c:=SCBdSimplex(3);; # create a simplicial complex object gap> SCFVector(c); [ 4, 6, 4 ] gap> SCSkel(c,0); [ [ 1 ], [ 2 ], [ 3 ], [ 4 ] ] </Log> is equivalent to <Log> gap> c:=SCBdSimplex(3);; # create a simplicial complex object gap> c.F; [ 4, 6, 4 ] gap> c.Skel(0); [ [ 1 ], [ 2 ], [ 3 ], [ 4 ] ] </Log> </Section> <Section Label="sec:DemoPropsCompl"> <Heading>Calculating properties of a <C>SCSimplicialComplex</C> object</Heading> <Package>simpcomp</Package> provides a variety of functions for calculating properties of simp <Log> gap> c1.F; [ 3, 3 ] gap> c1.FaceLattice; [ [ [ 1 ], [ 2 ], [ 3 ] ], [ [ 1, 2 ], [ 1, 3 ], [ 2, 3 ] ] ] gap> c1.AutomorphismGroup; S3 gap> c1.Generators; [ [ [ 1, 2 ], 3 ] ] gap> c3.Facets; [ [ 1, 2, 3 ], [ 1, 2, 8 ], [ 1, 3, 6 ], [ 1, 4, 6 ], [ 1, 4, 7 ], [ 1, 7, 8 ], [ 2, 3, 4 ], [ 2, 4, 7 ], [ 2, 5, 7 ], [ 2, 5, 8 ], [ 3, 4, 5 ], [ 3, 5, 8 ], [ 3, 6, 8 ], [ 4, 5, 6 ], [ 5, 6, 7 ], [ 6, 7, 8 ] ] gap> c3.F; [ 8, 24, 16 ] gap> c3.G; [ 4 ] gap> c3.H; [ 5, 11, -1 ] gap> c3.ASDet; 186624 gap> c3.Chi; 0 gap> c3.Generators; [ [ [ 1, 2, 3 ], 16 ] ] gap> c3.HasBoundary; false gap> c3.IsConnected; true gap> c3.IsCentrallySymmetric; true gap> c3.Vertices; [ 1, 2, 3, 4, 5, 6, 7, 8 ] gap> c3.ConnectedComponents; [ [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels. Name="Connected component #1 of complex from diffcycles [ [ 1, 1, 6 ], [ \ 3, 3, 2 ] ]" Dim=2 /SimplicialComplex] ] gap> c3.UnknownProperty; #I SCPropertyObject: unhandled property 'UnknownProperty'. Handled properties\ are [ "Equivalent", "IsKStackedSphere", "IsManifold", "IsMovable", "Move", "Moves", "RMoves", "ReduceAsSubcomplex", "Reduce", "ReduceEx", "Copy", "Recalc", "ASDet", "AutomorphismGroup", "AutomorphismGroupInternal", "Boundary", "ConnectedComponents", "Dim", "DualGraph", "Chi", "F", "FaceLattice", "FaceLatticeEx", "Faces", "FacesEx", "Facets", "FacetsEx", "FpBetti", "FundamentalGroup", "G", "Generators", "GeneratorsEx", "H", "HasBoundary", "HasInterior", "Homology", "Incidences", "IncidencesEx", "Interior", "IsCentrallySymmetric", "IsConnected", "IsEmpty", "IsEulerianManifold", "IsHomologySphere", "IsInKd", "IsKNeighborly", "IsOrientable", "IsPM", "IsPure", "IsShellable", "IsStronglyConnected", "MinimalNonFaces", "MinimalNonFacesEx", "Name", "Neighborliness", "Orientation", "Skel", "SkelEx", "SpanningTree", "StronglyConnectedComponents", "Vertices", "VerticesEx", "BoundaryOperatorMatrix", "HomologyBasis", "HomologyBasisAsSimplices", "HomologyInternal", "CoboundaryOperatorMatrix", "Cohomology", "CohomologyBasis", "CohomologyBasisAsSimplices", "CupProduct", "IntersectionForm", "IntersectionFormParity", "IntersectionFormDimensionality", "Load", "Save", "ExportPolymake", "ExportLatexTable", "ExportJavaView", "LabelMax", "LabelMin", "Labels", "Relabel", "RelabelStandard", "RelabelTransposition", "Rename", "SortComplex", "UnlabelFace", "AlexanderDual", "CollapseGreedy", "Cone", "DeletedJoin", "Difference", "HandleAddition", "Intersection", "IsIsomorphic", "IsSubcomplex", "Isomorphism", "IsomorphismEx", "Join", "Link", "Links", "Neighbors", "NeighborsEx", "Shelling", "ShellingExt", "Shellings", "Span", "Star", "Stars", "Suspension", "Union", "VertexIdentification", "Wedge", "DetermineTopologicalType", "Dim", "Facets", "VertexLabels", "Name", "Vertices", "IsConnected", "ConnectedComponents" ]. fail </Log> </Section> <Section Label="sec:DemoNewCompl"> <Heading>Creating new complexes from a <C>SCSimplicialComplex</C> object</Heading> As already mentioned, there is the possibility to generate new objects of type <C>SCSimplicialC <Log> gap> d:=c3+c3; [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels, Vertices. Name="complex from diffcycles [ [ 1, 1, 6 ], [ 3, 3, 2 ] ]#+-complex from dif\ fcycles [ [ 1, 1, 6 ], [ 3, 3, 2 ] ]" Dim=2 /SimplicialComplex] gap> SCRename(d,"T^2#T^2"); true gap> SCLink(d,1); [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels. Name="lk(1) in T^2#T^2" Dim=1 /SimplicialComplex] gap> SCStar(d,[1,2]); [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels. Name="star([ 1, 2 ]) in T^2#T^2" Dim=2 /SimplicialComplex] gap> SCRename(c3,"T^2"); true gap> SCConnectedProduct(c3,4); [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels, Vertices. Name="T^2#+-T^2#+-T^2#+-T^2" Dim=2 /SimplicialComplex] gap> SCCartesianProduct(c4,c4); [SimplicialComplex Properties known: Dim, Facets, Name, TopologicalType, VertexLabels. Name="S^1_3xS^1_3" Dim=2 TopologicalType="S^1xS^1" /SimplicialComplex] gap> SCCartesianPower(c4,3); [SimplicialComplex Properties known: Dim, Facets, Name, TopologicalType, VertexLabels. Name="(S^1_3)^3" Dim=3 TopologicalType="(S^1)^3" /SimplicialComplex] </Log> </Section> <Section Label="sec:DemoHom"> <Heading>Homology related calculations</Heading> <Package>simpcomp</Package> relies on the GAP package homology <Cite Key="Dumas04Homology" /> fo <Log> gap> s2s2:=SCCartesianProduct(SCBdSimplex(3),SCBdSimplex(3)); [SimplicialComplex Properties known: Dim, Facets, Name, TopologicalType, VertexLabels. Name="S^2_4xS^2_4" Dim=4 TopologicalType="S^2xS^2" /SimplicialComplex] gap> SCHomology(s2s2); [ [ 0, [ ] ], [ 0, [ ] ], [ 2, [ ] ], [ 0, [ ] ], [ 1, [ ] ] ] gap> SCHomologyInternal(s2s2); [ [ 0, [ ] ], [ 0, [ ] ], [ 2, [ ] ], [ 0, [ ] ], [ 1, [ ] ] ] gap> SCHomologyBasis(s2s2,2); [ [ 1, [ [ 1, 70 ], [ -1, 12 ], [ 1, 2 ], [ -1, 1 ] ] ], [ 1, [ [ 1, 143 ], [ -1, 51 ], [ 1, 29 ], [ -1, 25 ] ] ] ] gap> SCHomologyBasisAsSimplices(s2s2,2); [ [ 1, [ [ 1, [ 2, 3, 4 ] ], [ -1, [ 1, 3, 4 ] ], [ 1, [ 1, 2, 4 ] ], [ -1, [ 1 , 2, 3 ] ] ] ], [ 1, [ [ 1, [ 5, 9, 13 ] ], [ -1, [ 1, 9, 13 ] ], [ 1, [ 1, 5, 13 ] ], [ -1, [ 1, 5, 9 ] ] ] ] ] gap> SCCohomologyBasis(s2s2,2); [ [ 1, [ [ 1, 122 ], [ 1, 115 ], [ 1, 112 ], [ 1, 111 ], [ 1, 93 ], [ 1, 90 ], [ 1, 89 ], [ 1, 84 ], [ 1, 83 ], [ 1, 82 ], [ 1, 46 ], [ 1, 43 ], [ 1, 42 ], [ 1, 37 ], [ 1, 36 ], [ 1, 35 ], [ 1, 28 ], [ 1, 27 ], [ 1, 26 ], [ 1, 25 ] ] ], [ 1, [ [ 1, 213 ], [ 1, 201 ], [ 1, 192 ], [ 1, 189 ], [ 1, 159 ], [ 1, 150 ], [ 1, 147 ], [ 1, 131 ], [ 1, 128 ], [ 1, 125 ], [ 1, 67 ], [ 1, 58 ], [ 1, 55 ], [ 1, 39 ], [ 1, 36 ], [ 1, 33 ], [ 1, 10 ], [ 1, 7 ], [ 1, 4 ], [ 1, 1 ] ] ] ] gap> SCCohomologyBasisAsSimplices(s2s2,2); [ [ 1, [ [ 1, [ 4, 8, 12 ] ], [ 1, [ 3, 8, 12 ] ], [ 1, [ 3, 7, 12 ] ], [ 1, [ 3, 7, 11 ] ], [ 1, [ 2, 8, 12 ] ], [ 1, [ 2, 7, 12 ] ], [ 1, [ 2, 7, 11 ] ], [ 1, [ 2, 6, 12 ] ], [ 1, [ 2, 6, 11 ] ], [ 1, [ 2, 6, 10 ] ], [ 1, [ 1, 8, 12 ] ], [ 1, [ 1, 7, 12 ] ], [ 1, [ 1, 7, 11 ] ], [ 1, [ 1, 6, 12 ] ], [ 1, [ 1, 6, 11 ] ], [ 1, [ 1, 6, 10 ] ], [ 1, [ 1, 5, 12 ] ], [ 1, [ 1, 5, 11 ] ], [ 1, [ 1, 5, 10 ] ], [ 1, [ 1, 5, 9 ] ] ] ], [ 1, [ [ 1, [ 13, 14, 15 ] ], [ 1, [ 9, 14, 15 ] ], [ 1, [ 9, 10, 15 ] ], [ 1, [ 9, 10, 11 ] ], [ 1, [ 5, 14, 15 ] ], [ 1, [ 5, 10, 15 ] ], [ 1, [ 5, 10, 11 ] ], [ 1, [ 5, 6, 15 ] ], [ 1, [ 5, 6, 11 ] ], [ 1, [ 5, 6, 7 ] ], [ 1, [ 1, 14, 15 ] ], [ 1, [ 1, 10, 15 ] ], [ 1, [ 1, 10, 11 ] ], [ 1, [ 1, 6, 15 ] ], [ 1, [ 1, 6, 11 ] ], [ 1, [ 1, 6, 7 ] ], [ 1, [ 1, 2, 15 ] ], [ 1, [ 1, 2, 11 ] ], [ 1, [ 1, 2, 7 ] ], [ 1, [ 1, 2, 3 ] ] ] ] ] gap> PrintArray(SCIntersectionForm(s2s2)); [ [ 0, 1 ], [ 1, 0 ] ] gap> c:=s2s2+s2s2; [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels, Vertices. Name="S^2_4xS^2_4#+-S^2_4xS^2_4" Dim=4 /SimplicialComplex] gap> PrintArray(SCIntersectionForm(c)); [ [ 0, -1, 0, 0 ], [ -1, 0, 0, 0 ], [ 0, 0, 0, -1 ], [ 0, 0, -1, 0 ] ] </Log> </Section> <Section Label="sec:DemoBist"> <Heading>Bistellar flips</Heading> For a more detailed description of functions related to bistellar flips as well as a very short i <Log> gap> beta4:=SCBdCrossPolytope(4);; gap> s3:=SCBdSimplex(4);; gap> SCEquivalent(beta4,s3); #I round 0, move: [ [ 2, 6, 7 ], [ 3, 4 ] ] [ 8, 25, 34, 17 ] #I round 1, move: [ [ 2, 7 ], [ 3, 4, 5 ] ] [ 8, 24, 32, 16 ] #I round 2, move: [ [ 2, 5 ], [ 3, 4, 8 ] ] [ 8, 23, 30, 15 ] #I round 3, move: [ [ 2 ], [ 3, 4, 6, 8 ] ] [ 7, 19, 24, 12 ] #I round 4, move: [ [ 6, 8 ], [ 1, 3, 4 ] ] [ 7, 18, 22, 11 ] #I round 5, move: [ [ 8 ], [ 1, 3, 4, 5 ] ] [ 6, 14, 16, 8 ] #I round 6, move: [ [ 5 ], [ 1, 3, 4, 7 ] ] [ 5, 10, 10, 5 ] #I SCReduceComplexEx: complexes are bistellarly equivalent. true gap> SCBistellarOptions.WriteLevel; 0 gap> SCBistellarOptions.WriteLevel:=1; 1 gap> SCEquivalent(beta4,s3); #I SCLibInit: made directory "~/PATH" for user library. #I SCIntFunc.SCLibInit: index not found -- trying to reconstruct it. #I SCLibUpdate: rebuilding index for ~/PATH. #I SCLibUpdate: rebuilding index done. #I round 0, move: [ [ 2, 4, 6 ], [ 7, 8 ] ] [ 8, 25, 34, 17 ] #I round 1, move: [ [ 2, 4 ], [ 5, 7, 8 ] ] [ 8, 24, 32, 16 ] #I round 2, move: [ [ 4, 5 ], [ 1, 7, 8 ] ] [ 8, 23, 30, 15 ] #I round 3, move: [ [ 4 ], [ 1, 6, 7, 8 ] ] [ 7, 19, 24, 12 ] #I SCLibAdd: saving complex to file "complex_ReducedComplex_7_vertices_3_2009\ -10-27_11-40-00.sc". #I round 4, move: [ [ 2, 6 ], [ 3, 7, 8 ] ] [ 7, 18, 22, 11 ] #I round 5, move: [ [ 2 ], [ 3, 5, 7, 8 ] ] [ 6, 14, 16, 8 ] #I SCLibAdd: saving complex to file "complex_ReducedComplex_6_vertices_5_2009\ -10-27_11-40-00.sc". #I round 6, move: [ [ 5 ], [ 1, 3, 7, 8 ] ] [ 5, 10, 10, 5 ] #I SCLibAdd: saving complex to file "complex_ReducedComplex_5_vertices_6_2009\ -10-27_11-40-00.sc". #I SCLibAdd: saving complex to file "complex_ReducedComplex_5_vertices_7_2009\ -10-27_11-40-00.sc". #I SCReduceComplexEx: complexes are bistellarly equivalent. true gap> myLib:=SCLibInit("~/PATH"); # copy path from above [Simplicial complex library. Properties: CalculateIndexAttributes=true Number of complexes in library=4 IndexAttributes=[ "Name", "Date", "Dim", "F", "G", "H", "Chi", "Homology" ] Loaded=true Path="/home/spreerjn/reducedComplexes/2009-10-27_11-40-00/" ] gap> s3:=myLib.Load(3); [SimplicialComplex Properties known: Chi, Date, Dim, F, Faces, Facets, G, H, Homology, IsConnected, Name, VertexLabels. Name="ReducedComplex_5_vertices_6" Dim=3 Chi=0 F=[ 5, 10, 10, 5 ] G=[ 0, 0 ] H=[ 1, 1, 1, 1 ] Homology=[ [ 0, [ ] ], [ 0, [ ] ], [ 0, [ ] ], [ 1, [ ] ] ] IsConnected=true /SimplicialComplex] gap> s3:=myLib.Load(2); [SimplicialComplex Properties known: Chi, Date, Dim, F, Faces, Facets, G, H, Homology, IsConnected, Name, VertexLabels. Name="ReducedComplex_6_vertices_5" Dim=3 Chi=0 F=[ 6, 14, 16, 8 ] G=[ 1, 0 ] H=[ 2, 2, 2, 1 ] Homology=[ [ 0, [ ] ], [ 0, [ ] ], [ 0, [ ] ], [ 1, [ ] ] ] IsConnected=true /SimplicialComplex] gap> t2:=SCCartesianProduct(SCBdSimplex(2),SCBdSimplex(2));; gap> t2.F; [ 9, 27, 18 ] gap> SCBistellarOptions.WriteLevel:=0; 0 gap> SCBistellarOptions.LogLevel:=0; 0 gap> mint2:=SCReduceComplex(t2); [ true, [SimplicialComplex Properties known: Dim, Facets, Name, VertexLabels. Name="unnamed complex 85" Dim=2 /SimplicialComplex], 32 ] </Log> </Section> <Section Label="sec:DemoBlowups"> <Heading>Simplicial blowups</Heading> For a more detailed description of functions related to simplicial blowups see Chapter <Ref Cha <Log> gap> list:=SCLib.SearchByName("Kummer"); [ [ 7493, "4-dimensional Kummer variety (VT)" ] ] gap> c:=SCLib.Load(7493); [SimplicialComplex Properties known: AltshulerSteinberg, AutomorphismGroup, AutomorphismGroupSize, AutomorphismGroupStructure, AutomorphismGroupTransitivity, ConnectedComponents, Date, Dim, DualGraph, EulerCharacteristic, FacetsEx, GVector, GeneratorsEx, HVector, HasBoundary, HasInterior, Homology, Interior, IsCentrallySymmetric, IsConnected, IsEulerianManifold, IsManifold, IsOrientable, IsPseudoManifold, IsPure, IsStronglyConnected, MinimalNonFacesEx, Name, Neighborliness, NumFaces[], Orientation, SkelExs[], Vertices. Name="4-dimensional Kummer variety (VT)" Dim=4 AltshulerSteinberg=45137758519296000000000000 AutomorphismGroupSize=1920 AutomorphismGroupStructure="((C2 x C2 x C2 x C2) : A5) : C2" AutomorphismGroupTransitivity=1 EulerCharacteristic=8 GVector=[ 10, 55, 60 ] HVector=[ 11, 66, 126, -19, 7 ] HasBoundary=false HasInterior=true Homology=[ [0, [ ] ], [0, [ ] ], [6, [2,2,2,2,2] ], [0, [ ] ], [1, [ ] ] ] IsCentrallySymmetric=false IsConnected=true IsEulerianManifold=true IsOrientable=true IsPseudoManifold=true IsPure=true IsStronglyConnected=true Neighborliness=2 /SimplicialComplex] gap> lk:=SCLink(c,1); [SimplicialComplex Properties known: Dim, FacetsEx, Name, Vertices. Name="lk([ 1 ]) in 4-dimensional Kummer variety (VT)" Dim=3 /SimplicialComplex] gap> SCHomology(lk); [ [ 0, [ ] ], [ 0, [ 2 ] ], [ 0, [ ] ], [ 1, [ ] ] ] gap> SCLibDetermineTopologicalType(lk); [ 45, 113, 2426, 2502, 7470 ] gap> d:=SCLib.Load(45);; gap> d.Name; "RP^3" gap> SCEquivalent(lk,d); #I SCReduceComplexEx: complexes are bistellarly equivalent. true gap> e:=SCBlowup(c,1); #I SCBlowup: checking if singularity is a combinatorial manifold... #I SCBlowup: ...true #I SCBlowup: checking type of singularity... #I SCReduceComplexEx: complexes are bistellarly equivalent. #I SCBlowup: ...ordinary double point (supported type). #I SCBlowup: starting blowup... #I SCBlowup: map boundaries... #I SCBlowup: boundaries not isomorphic, initializing bistellar moves... #I SCBlowup: found complex with smaller boundary: f = [ 15, 74, 118, 59 ]. #I SCBlowup: found complex with smaller boundary: f = [ 14, 70, 112, 56 ]. #I SCBlowup: found complex with smaller boundary: f = [ 14, 69, 110, 55 ]. #I SCBlowup: found complex with smaller boundary: f = [ 14, 68, 108, 54 ]. #I SCBlowup: found complex with smaller boundary: f = [ 13, 64, 102, 51 ]. #I SCBlowup: found complex with smaller boundary: f = [ 13, 63, 100, 50 ]. #I SCBlowup: found complex with smaller boundary: f = [ 13, 62, 98, 49 ]. #I SCBlowup: found complex with smaller boundary: f = [ 12, 58, 92, 46 ]. #I SCBlowup: found complex with smaller boundary: f = [ 12, 57, 90, 45 ]. #I SCBlowup: found complex with smaller boundary: f = [ 12, 56, 88, 44 ]. #I SCBlowup: found complex with smaller boundary: f = [ 11, 52, 82, 41 ]. #I SCBlowup: found complex with smaller boundary: f = [ 11, 51, 80, 40 ]. #I SCBlowup: found complex with isomorphic boundaries. #I SCBlowup: ...boundaries mapped succesfully. #I SCBlowup: build complex... #I SCBlowup: ...done. #I SCBlowup: ...blowup completed. #I SCBlowup: You may now want to reduce the complex via 'SCReduceComplex'. [SimplicialComplex Properties known: Dim, FacetsEx, Name, Vertices. Name="unnamed complex 6315 \ star([ 1 ]) in unnamed complex 6315 cup unnamed\ complex 6319 cup unnamed complex 6317" Dim=4 /SimplicialComplex] gap> SCHomology(c); [ [ 0, [ ] ], [ 0, [ ] ], [ 6, [ 2, 2, 2, 2, 2 ] ], [ 0, [ ] ], [ 1, [ ] ] ] gap> SCHomology(e); [ [ 0, [ ] ], [ 0, [ ] ], [ 7, [ 2, 2, 2, 2 ] ], [ 0, [ ] ], [ 1, [ ] ] ] </Log> </Section> <Section Label="sec:DemoDiscreteNormalSurface"> <Heading>Discrete normal surfaces and slicings</Heading> For a more detailed description of functions related to discrete normal surfaces and slicings <Log> gap> # the boundary of the cyclic 4-polytope with 6 vertices gap> c:=SCBdCyclicPolytope(4,6); [SimplicialComplex Properties known: Dim, EulerCharacteristic, FacetsEx, HasBoundary, Homology,\ IsConnected, IsStronglyConnected, Name, NumFaces[], TopologicalType, Vertices. Name="Bd(C_4(6))" Dim=3 EulerCharacteristic=0 HasBoundary=false Homology=[ [ 0, [ ] ], [ 0, [ ] ], [ 0, [ ] ], [ 1, [ ] ] ] IsConnected=true IsStronglyConnected=true TopologicalType="S^3" /SimplicialComplex] gap> # slicing in between the odd and the even vertex labels, a polyhedral torus gap> sl:=SCSlicing(c,[[2,4,6],[1,3,5]]); [NormalSurface Properties known: ConnectedComponents, Dim, EulerCharacteristic, FVector,\ FacetsEx, Genus, IsConnected, IsOrientable, NSTriangulation, Name,\ TopologicalType, Vertices. Name="slicing [ [ 2, 4, 6 ], [ 1, 3, 5 ] ] of Bd(C_4(6))" Dim=2 FVector=[ 9, 18, 0, 9 ] EulerCharacteristic=0 IsOrientable=true TopologicalType="T^2" /NormalSurface] gap> sl.Homology; [ [ 0, [ ] ], [ 2, [ ] ], [ 1, [ ] ] ] gap> sl.Genus; 1 gap> sl.F; # the slicing constists of 9 quadrilaterals and 0 triangles [ 9, 18, 0, 9 ] gap> PrintArray(sl.Facets); [ [ [ 2, 1 ], [ 2, 3 ], [ 4, 1 ], [ 4, 3 ] ], [ [ 2, 1 ], [ 2, 3 ], [ 6, 1 ], [ 6, 3 ] ], [ [ 2, 1 ], [ 2, 5 ], [ 4, 1 ], [ 4, 5 ] ], [ [ 2, 1 ], [ 2, 5 ], [ 6, 1 ], [ 6, 5 ] ], [ [ 2, 3 ], [ 2, 5 ], [ 4, 3 ], [ 4, 5 ] ], [ [ 2, 3 ], [ 2, 5 ], [ 6, 3 ], [ 6, 5 ] ], [ [ 4, 1 ], [ 4, 3 ], [ 6, 1 ], [ 6, 3 ] ], [ [ 4, 1 ], [ 4, 5 ], [ 6, 1 ], [ 6, 5 ] ], [ [ 4, 3 ], [ 4, 5 ], [ 6, 3 ], [ 6, 5 ] ] ] </Log></Section> Further example computations can be found in the slides of various talks about <Package>simpcom </Chapter> [ zur Elbe Produktseite wechseln0.27Quellennavigators Analyse erneut starten ] |
2026-03-28