<?xml version="1.0" encoding="utf-8" ?> <!-- for emacs: -*- coding: utf-8 -*- --> <!-- Apache may like this line in the file .htaccess: AddCharset utf-8 .html --> <!DOCTYPE html PUBLIC "-//W3C//DTD XHTML 1.1 plus MathML 2.0 plus SVG 1.1//EN" "http://www.w3.org/2002/04/xhtml-math-svg/xhtml-math-svg-flat.dtd" > <html xmlns="http://www.w3.org/1999/xhtml" xml:lang="en"> <head><title>Symbol Index</title> <link rel="stylesheet" type="text/css" href="../../../../Macaulay2/Style/doc.css"/> </head> <body><div><a href="index.html">top</a> | <a href="toc.html">toc</a> | <a href="http://www.math.uiuc.edu/Macaulay2/">Macaulay2 web site</a></div> <hr/> <h1>Symbol Index</h1> <div><a href="#A">A</a> <a href="#B">B</a> <a href="#C">C</a> <a href="#D">D</a> <a href="#E">E</a> <a href="#F">F</a> <a href="#G">G</a> <a href="#H">H</a> <a href="#I">I</a> <a href="#J">J</a> <a href="#K">K</a> <a href="#L">L</a> <a href="#M">M</a> <a href="#N">N</a> <a href="#O">O</a> <a href="#P">P</a> <a href="#Q">Q</a> <a href="#R">R</a> <a href="#S">S</a> <a href="#T">T</a> <a href="#U">U</a> <a href="#V">V</a> <a href="#W">W</a> <a href="#X">X</a> <a href="#Y">Y</a> <a href="#Z">Z</a></div> <ul><li><span><a id="A"/></span><span><a href="_add__Cone.html" title="adds cones to a Fan">addCone</a> -- adds cones to a Fan</span></li> <li><span><a href="_affine__Hull.html" title="computes the affine hull of a polyhedron">affineHull</a> -- computes the affine hull of a polyhedron</span></li> <li><span><a href="_affine__Image.html" title="computes the affine image of a cone or polyhedron">affineImage</a> -- computes the affine image of a cone or polyhedron</span></li> <li><span><a href="_affine__Preimage.html" title="computes the affine preimage of a cone or polyhedron">affinePreimage</a> -- computes the affine preimage of a cone or polyhedron</span></li> <li><span><a href="_amb__Dim.html" title="ambient dimension of a Polyhedron, Cone or Fan">ambDim</a> -- ambient dimension of a Polyhedron, Cone or Fan</span></li> <li><span><a href="_are__Compatible.html" title="checks if the intersection of two cones is a face of each">areCompatible</a> -- checks if the intersection of two cones is a face of each</span></li> <li><span><a id="B"/></span><span><a href="_bipyramid.html" title="computes the bipyramid over a polyhedron">bipyramid</a> -- computes the bipyramid over a polyhedron</span></li> <li><span><a id="C"/></span><span><a href="_cc__Refinement.html" title="computes the coarsest common refinement of a set of rays">ccRefinement</a> -- computes the coarsest common refinement of a set of rays</span></li> <li><span><a href="_cell__Decompose.html" title="computes the regular cell decomposition">cellDecompose</a> -- computes the regular cell decomposition</span></li> <li><span><a href="_common__Face.html" title="checks if the intersection is a face of both Cones or Polyhedra, or of cones with fans">commonFace</a> -- checks if the intersection is a face of both Cones or Polyhedra, or of cones with fans</span></li> <li><span><a href="___Cone.html" title="the class of all rational convex polyhedral cones">Cone</a> -- the class of all rational convex polyhedral cones</span></li> <li><span><a href="_cones.html" title="computes all cones of a fan of a certain dimension">cones</a> -- computes all cones of a fan of a certain dimension</span></li> <li><span><a href="_cone__To__Polyhedron.html" title="converts a cone to class Polyhedron">coneToPolyhedron</a> -- converts a cone to class Polyhedron</span></li> <li><span><a href="_contains.html" title="checks if the first argument contains the second argument">contains</a> -- checks if the first argument contains the second argument</span></li> <li><span><a href="_convex__Hull.html" title="computing the convex hull of points, rays and polyhedra">convexHull</a> -- computing the convex hull of points, rays and polyhedra</span></li> <li><span><a href="_cross__Polytope.html" title="computes the d-dimensional crosspolytope with diameter 2s">crossPolytope</a> -- computes the d-dimensional crosspolytope with diameter 2s</span></li> <li><span><a href="_cyclic__Polytope.html" title="computes the d dimensional cyclic polytope with n vertices">cyclicPolytope</a> -- computes the d dimensional cyclic polytope with n vertices</span></li> <li><span><a id="D"/></span><span><a href="_direct__Product.html" title="computes the direct product of two convex objects">directProduct</a> -- computes the direct product of two convex objects</span></li> <li><span><a href="_dual__Cone.html" title=" computes the dual Cone">dualCone</a> -- computes the dual Cone</span></li> <li><span><a href="_dual__Face__Lattice.html" title="computes the dual face lattice of a cone or polyhedron">dualFaceLattice</a> -- computes the dual face lattice of a cone or polyhedron</span></li> <li><span><a id="E"/></span><span><a href="_ehrhart.html" title="calculates the Ehrhart polynomial of a polytope">ehrhart</a> -- calculates the Ehrhart polynomial of a polytope</span></li> <li><span><a href="_empty__Polyhedron.html" title="generates the empty polyhedron in n-space">emptyPolyhedron</a> -- generates the empty polyhedron in n-space</span></li> <li><span><a id="F"/></span><span><a href="_face__Fan.html" title=" computes the fan generated by the cones over the faces">faceFan</a> -- computes the fan generated by the cones over the faces</span></li> <li><span><a href="_face__Lattice.html" title="computes the face lattice of a cone or polyhedron">faceLattice</a> -- computes the face lattice of a cone or polyhedron</span></li> <li><span><a href="_faces.html" title="computes all faces of a certain codimension of a Cone or Polyhedron">faces</a> -- computes all faces of a certain codimension of a Cone or Polyhedron</span></li> <li><span><a href="___Fan.html" title="the class of all fans">Fan</a> -- the class of all fans</span></li> <li><span><a href="_fan.html" title="generates a Fan">fan</a> -- generates a Fan</span></li> <li><span><a href="_f__Vector.html" title="computes the f-vector of a Cone or Polyhedron">fVector</a> -- computes the f-vector of a Cone or Polyhedron</span></li> <li><span><a id="G"/></span><span><a href="_gen__Cones.html" title="displays the generating Cones of a Fan">genCones</a> -- displays the generating Cones of a Fan</span></li> <li><span><a id="H"/></span><span><a href="_halfspaces.html" title="computes the defining half-spaces of a Cone or a Polyhedron">halfspaces</a> -- computes the defining half-spaces of a Cone or a Polyhedron</span></li> <li><span><a href="_hilbert__Basis.html" title="computes the Hilbert basis of a Cone">hilbertBasis</a> -- computes the Hilbert basis of a Cone</span></li> <li><span><a href="_hirzebruch.html" title="computes the fan of the r-th Hirzebruch surface">hirzebruch</a> -- computes the fan of the r-th Hirzebruch surface</span></li> <li><span><a href="_hypercube.html" title="computes the d-dimensional hypercube with edge length 2*s">hypercube</a> -- computes the d-dimensional hypercube with edge length 2*s</span></li> <li><span><a href="_hyperplanes.html" title="computes the defining hyperplanes of a Cone or a Polyhedron">hyperplanes</a> -- computes the defining hyperplanes of a Cone or a Polyhedron</span></li> <li><span><a id="I"/></span><span><a href="_image__Fan.html" title=" computes the fan of the image">imageFan</a> -- computes the fan of the image</span></li> <li><span><a href="_incomp__Cones.html" title="returns the pairs of incompatible cones">incompCones</a> -- returns the pairs of incompatible cones</span></li> <li><span><a href="_in__Interior.html" title="checks if a point lies in the relative interior of a Cone/Polyhedron">inInterior</a> -- checks if a point lies in the relative interior of a Cone/Polyhedron</span></li> <li><span><a href="_interior__Point.html" title="computes a point in the relative interior of the Polyhedron">interiorPoint</a> -- computes a point in the relative interior of the Polyhedron</span></li> <li><span><a href="_interior__Vector.html" title="computes a vector in the relative interior of a Cone">interiorVector</a> -- computes a vector in the relative interior of a Cone</span></li> <li><span><a href="_intersection.html" title="computes the intersection of half-spaces, hyperplanes, cones, and polyhedra">intersection</a> -- computes the intersection of half-spaces, hyperplanes, cones, and polyhedra</span></li> <li><span><a href="_is__Compact.html" title="checks compactness of a Polyhedron">isCompact</a> -- checks compactness of a Polyhedron</span></li> <li><span><a href="_is__Complete.html" title="checks completeness of a Fan">isComplete</a> -- checks completeness of a Fan</span></li> <li><span><a href="_is__Empty.html" title="checks if a Polyhedron is empty">isEmpty</a> -- checks if a Polyhedron is empty</span></li> <li><span><a href="_is__Face.html" title="tests if the first argument is a face of the second">isFace</a> -- tests if the first argument is a face of the second</span></li> <li><span><a href="_is__Pointed.html" title="checks if a Cone or Fan is pointed">isPointed</a> -- checks if a Cone or Fan is pointed</span></li> <li><span><a href="_is__Polytopal.html" title="checks if a Fan is polytopal">isPolytopal</a> -- checks if a Fan is polytopal</span></li> <li><span><a href="_is__Pure.html" title="checks if a Fan is of pure dimension">isPure</a> -- checks if a Fan is of pure dimension</span></li> <li><span><a href="_is__Smooth.html" title="checks if a Cone or Fan is smooth">isSmooth</a> -- checks if a Cone or Fan is smooth</span></li> <li><span><a id="J"/><a id="K"/><a id="L"/></span><span><a href="_lattice__Points.html" title="computes the lattice points of a polytope">latticePoints</a> -- computes the lattice points of a polytope</span></li> <li><span><a href="_lin__Space.html" title="computes a basis of the lineality space">linSpace</a> -- computes a basis of the lineality space</span></li> <li><span><a id="M"/></span><span><a href="_max__Face.html" title="computes the face of a Polyhedron or Cone where a weight attains its maximum">maxFace</a> -- computes the face of a Polyhedron or Cone where a weight attains its maximum</span></li> <li><span><a href="_min__Face.html" title="computes the face of a Polyhedron or Cone where a weight attains its minimum">minFace</a> -- computes the face of a Polyhedron or Cone where a weight attains its minimum</span></li> <li><span><a href="_minkowski__Sum.html" title=" computes the Minkowski sum of two convex objects">minkowskiSum</a> -- computes the Minkowski sum of two convex objects</span></li> <li><span><a href="_mink__Summand__Cone.html" title="computes the Cone of all Minkowski summands and the minimal decompositions">minkSummandCone</a> -- computes the Cone of all Minkowski summands and the minimal decompositions</span></li> <li><span><a id="N"/></span><span><a href="_newton__Polytope.html" title="computes the Newton polytope of a polynomial">newtonPolytope</a> -- computes the Newton polytope of a polynomial</span></li> <li><span><a href="_normal__Fan.html" title="computes the normalFan of a polyhedron">normalFan</a> -- computes the normalFan of a polyhedron</span></li> <li><span><a id="O"/></span><span><a href="_objective__Vector.html" title="computes an objective vector of a face of a polyhedron">objectiveVector</a> -- computes an objective vector of a face of a polyhedron</span></li> <li><span><a id="P"/></span><span><a href="_polar.html" title=" computes the polar of a polyhedron">polar</a> -- computes the polar of a polyhedron</span></li> <li><span><a href="index.html" title="for computations with convex polyhedra, cones, and fans">Polyhedra</a> -- for computations with convex polyhedra, cones, and fans</span></li> <li><span><a href="___Polyhedral__Object.html" title="the class of all polyhedral objects in Polyhedra">PolyhedralObject</a> -- the class of all polyhedral objects in Polyhedra</span></li> <li><span><a href="___Polyhedron.html" title="the class of all convex polyhedra">Polyhedron</a> -- the class of all convex polyhedra</span></li> <li><span><a href="_polytope.html" title="returns a polytope of which the fan is the normal fan if it is polytopal">polytope</a> -- returns a polytope of which the fan is the normal fan if it is polytopal</span></li> <li><span><a href="_pos__Hull.html" title="computes the positive hull of rays, cones, and the cone over a polyhedron">posHull</a> -- computes the positive hull of rays, cones, and the cone over a polyhedron</span></li> <li><span><a href="_pos__Orthant.html" title="generates the positive orthant in n-space">posOrthant</a> -- generates the positive orthant in n-space</span></li> <li><span><a href="_proximum.html" title="computes the proximum of the Polyhedron/Cone to a point in euclidian metric">proximum</a> -- computes the proximum of the Polyhedron/Cone to a point in euclidian metric</span></li> <li><span><a href="_pyramid.html" title="computes the pyramid over a polyhedron">pyramid</a> -- computes the pyramid over a polyhedron</span></li> <li><span><a id="Q"/><a id="R"/></span><span><a href="_rays.html" title="displays all rays of a Cone, a Fan, or a Polyhedron">rays</a> -- displays all rays of a Cone, a Fan, or a Polyhedron</span></li> <li><span><a id="S"/></span><span><a href="_save__Session.html" title="save the actual Polyhedra session to a file">saveSession</a> -- save the actual Polyhedra session to a file</span></li> <li><span><a href="_secondary__Polytope.html" title="computes the secondary polytope of a compact polyhedron">secondaryPolytope</a> -- computes the secondary polytope of a compact polyhedron</span></li> <li><span><a href="_skeleton.html" title="computes the k-skeleton of a Fan">skeleton</a> -- computes the k-skeleton of a Fan</span></li> <li><span><a href="_smallest__Face.html" title="determines the smallest face of the Cone/Polyhedron containing a point">smallestFace</a> -- determines the smallest face of the Cone/Polyhedron containing a point</span></li> <li><span><a href="_smooth__Subfan.html" title="computes the subfan of all smooth cones">smoothSubfan</a> -- computes the subfan of all smooth cones</span></li> <li><span><a href="_state__Polytope.html" title="computes the state polytope of a homogeneous ideal">statePolytope</a> -- computes the state polytope of a homogeneous ideal</span></li> <li><span><a href="_std__Simplex.html" title="generates the d-dimensional standard simplex">stdSimplex</a> -- generates the d-dimensional standard simplex</span></li> <li><span><a href="_stellar__Subdivision.html" title="computes the stellar subdivision of the fan by a ray">stellarSubdivision</a> -- computes the stellar subdivision of the fan by a ray</span></li> <li><span><a href="_sublattice__Basis.html" title="computes a basis for the sublattice generated by integral vectors or the lattice points of a polytope">sublatticeBasis</a> -- computes a basis for the sublattice generated by integral vectors or the lattice points of a polytope</span></li> <li><span><a id="T"/></span><span><a href="_tail__Cone.html" title="computes the tail/recession cone of a polyhedron">tailCone</a> -- computes the tail/recession cone of a polyhedron</span></li> <li><span><a href="_to__Sublattice.html" title="calculates the preimage of a polytope in the sublattice generated by its lattice points">toSublattice</a> -- calculates the preimage of a polytope in the sublattice generated by its lattice points</span></li> <li><span><a href="_triangulate.html" title="computes a triangulation of a polytope">triangulate</a> -- computes a triangulation of a polytope</span></li> <li><span><a id="U"/><a id="V"/></span><span><a href="_vertex__Edge__Matrix.html" title="computes the vertex-edge-relations matrix">vertexEdgeMatrix</a> -- computes the vertex-edge-relations matrix</span></li> <li><span><a href="_vertex__Facet__Matrix.html" title="computes the vertex-facet-relations matrix">vertexFacetMatrix</a> -- computes the vertex-facet-relations matrix</span></li> <li><span><a href="_vertices.html" title="displays the vertices of a Polyhedron">vertices</a> -- displays the vertices of a Polyhedron</span></li> <li><span><a href="_volume.html" title="computes the volume of a polytope">volume</a> -- computes the volume of a polytope</span></li> </ul> <div><span><a id="W"/><a id="X"/><a id="Y"/><a id="Z"/></span></div> </body> </html>
