| Quellcodebibliothek Statistik Leitseite products/sources/formale Sprachen/GAP/pkg/nconvex/gap/ (Algebra von RWTH Aachen Version 4.15.1©) Datei vom 28.11.2024 mit Größe 6 kB |
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Quelle Fan.gd Sprache: unbekannt |
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# SPDX-License-Identifier: GPL-2.0-or-later
# NConvex: A Gap package to perform polyhedral computations # # Declarations # #! @Chapter Fans #! @Section Constructors #! ## DeclareCategory( "IsFan", IsConvexObject ); #! @Arguments F #! @Returns a fan object #! @Description #! If the input <A>F</A> is fan then return <A>F</A>. DeclareOperation( "Fan", [ IsFan ] ); #! @Arguments C #! @Returns a fan object #! @Description #! The input is a list of list $C$. the output is the fan defined by the cones #! $\{\mathrm{Cone}_i(C_i )\}_{C_i\in C}$. DeclareOperation( "Fan", [ IsList ] ); #! @Arguments R, C #! @Returns a fan object #! @Description #! The input is two lists, $R$ that indicates the rays and $C$ #! that indicates the cones. The output is the fan defined by the cones #! $\{\mathrm{Cone}_i(\{ R_j, j\in C_i\} )\}_{C_i\in C}$. DeclareOperation( "Fan", [ IsList, IsList ] ); #! @InsertChunk fan1 #! @InsertChunk fan2 DeclareOperation( "FanWithFixedRays", [ IsList, IsList ] ); DeclareOperation( "DeriveFansFromTriangulation", [ IsList, IsBool ] ); #! @Arguments R #! @Returns a list of fans #! @Description #! The input is a list of ray generators $R$. Provided that the package #! TopcomInterface is available, this function computes the list of all #! fine and regular triangulations of these ray generators. It then returns #! the list of the associated fans of these triangulations. DeclareOperation( "FansFromTriangulation", [ IsList ] ); #! @Arguments R #! @Returns a fan #! @Description #! The input is a list of ray generators $R$. Provided that the package #! TopcomInterface is available, this function computes a #! fine and regular triangulation of these ray generators and returns #! the associated fan. DeclareOperation( "FanFromTriangulation", [ IsList ] ); #! @InsertChunk fan3 ################################## ## ## Attributes ## ################################## #! @Chapter Fans #! @Section Attributes #! #! @Arguments F #! @Returns a list #! @Description #! The input is a fan <A>F</A>. The output is the set of all ray generators of the maximal cones in the fa DeclareAttribute( "RayGenerators", IsFan ); #! @Arguments F #! @Returns a list #! @Description #! The input is a fan <A>F</A>. The output is the given or defining set of ray generators of the maximal DeclareAttribute( "GivenRayGenerators", IsFan ); #! @Arguments F #! @Returns a list #! @Description #! The input is a fan <A>F</A>. The output is a list of lists. #! which represent an incidence matrix for the correspondence of the rays and the maximal cones #! The i'th list in the result represents the i'th maximal cone of <A>F</A>. #! In such a list, the j'th entry is $1$ if the j'th ray is in the cone, 0 otherwise. DeclareAttribute( "RaysInMaximalCones", IsFan ); #! @Arguments F #! @Returns a list #! @Description #! The input is a fan <A>F</A>. The output is a list of the maximal cones of <A>F</A>. DeclareAttribute( "MaximalCones", IsFan ); #! @Arguments F #! @Returns a list #! @Description #! Description DeclareAttribute( "FVector", IsFan ); DeclareAttribute( "RaysInAllCones", IsFan ); DeclareAttribute( "RaysInTheGivenMaximalCones", IsFan ); DeclareAttribute( "GivenMaximalCones", IsFan ); DeclareAttribute( "AllCones", IsFan ); DeclareAttribute( "Rays", IsFan ); DeclareAttribute( "PrimitiveCollections", IsFan ); ################################# ## ## Properties ## ################################# #! @Chapter Fans #! @Section Properties #! #! @Arguments F #! @Returns a true or false #! @Description #! It checks whether the constructed fan is well defined or not. DeclareProperty( "IsWellDefinedFan", IsFan ); #! @Arguments F #! @Returns a true or false #! @Description #! Checks whether the fan is complete, i.e. if its support is the whole space. DeclareProperty( "IsComplete", IsFan ); #! @Arguments F #! @Returns a true or false #! @Description #! Checks whether the fan is pointed, i.e., that every cone it contains is pointed. DeclareProperty( "IsPointed", IsFan ); #! @Arguments F #! @Returns a true or false #! @Description #! Checks if the fan is smooth, i.e. if every cone in the fan is smooth. DeclareProperty( "IsSmooth", IsFan ); #! @Arguments F #! @Returns a true or false #! @Description #! Checks if the fan is simplicial, i.e. if every cone in the fan is simplicial. DeclareProperty( "IsSimplicial", IsFan ); #! @Arguments F #! @Returns a true or false #! @Description #! Checks if the fan is normal as described in (Theorem 4.7, Combinatorial convexity and algebr DeclareProperty( "IsNormalFan", IsFan ); #! @Arguments F #! @Returns a true or false #! @Description #! Synonyme to <C>IsNormalFan</C> DeclareProperty( "IsRegularFan", IsFan ); #! @Arguments F #! @Returns a true or false #! @Description #! Checks whether the fan is a fano fan. DeclareProperty( "IsFanoFan", IsFan ); ################################# ## ## Operations on fans ## ################################# #! @Chapter Fans #! @Section Operations on fans #! DeclareOperation( "\*", [ IsFan, IsFan ] ); DeclareOperation( "ToricStarFan", [ IsFan, IsFan ] ); DeclareOperation( "CanonicalizeFan", [ IsFan ] ); DeclareOperation( "MaximalCones", [ IsFan, IsInt ] ); #! @InsertChunk fan4 ################################# ## ## some extra operations ## ################################ DeclareOperation( "FirstLessTheSecond", [ IsList, IsList] ); DeclareOperation( "OneMaximalConeInList", [ IsList] ); DeclareOperation( "ListOfMaximalConesInList", [ IsList] ); [ Dauer der Verarbeitung: 0.28 Sekunden (vorverarbeitet) ] |
2026-03-28