external_software

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external_software [2019/01/29 22:20] – external edit 127.0.0.1external_software [2019/02/28 10:55] – [Further Interfaces] panizzut
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   .. Normaliz is a tool for computations in affine monoids, vector configurations, lattice polytopes, and rational cones. Since version 2.8 it comes with a very fast parallelized algorithm for lattice point enumeration.   .. Normaliz is a tool for computations in affine monoids, vector configurations, lattice polytopes, and rational cones. Since version 2.8 it comes with a very fast parallelized algorithm for lattice point enumeration.
   ** <BOOKMARK:jreality>''jreality'': Provides an interface to [[http://www3.math.tu-berlin.de/jreality/|jReality]] (by Charles Gunn, Tim Hoffmann, Markus Schmies, Steffen Weissmann et al., [[http://www3.math.tu-berlin.de/geometrie/lab/index.shtml|Geometry Group]], TU Berlin).\\ Needs [[http://ant.apache.org/|ant]] to be built.   ** <BOOKMARK:jreality>''jreality'': Provides an interface to [[http://www3.math.tu-berlin.de/jreality/|jReality]] (by Charles Gunn, Tim Hoffmann, Markus Schmies, Steffen Weissmann et al., [[http://www3.math.tu-berlin.de/geometrie/lab/index.shtml|Geometry Group]], TU Berlin).\\ Needs [[http://ant.apache.org/|ant]] to be built.
-  .. High-end visualization in 3D (experimental).  Since polymake release 2.9.9, a stable snapshot of jReality source code is bundled with polymake.  You don't need to download it separately unless you will try a most recent version of it.+  .. High-end visualization in 3D (experimental). stable snapshot of jReality source code is bundled with polymake.  You don't need to download it separately unless you will try a most recent version of it.
  
 === Bare interfaces === === Bare interfaces ===
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   ** [[http://www.math.ucdavis.edu/~mkoeppe/latte/|LattE macchiato]]\\ by [[http://www.math.ucdavis.edu/~mkoeppe|Matthias Köppe]].   ** [[http://www.math.ucdavis.edu/~mkoeppe/latte/|LattE macchiato]]\\ by [[http://www.math.ucdavis.edu/~mkoeppe|Matthias Köppe]].
   .. LattE macchiato is an improved version of LattE, derived from the latest release 1.2. For full functionality either choose the version "LattE, for tea, too", that also installs 4ti2 and other required packages or first install [[http://www.rambau.wm.uni-bayreuth.de/TOPCOM/|TOPCOM]], [[http://www.shoup.net/ntl/|NTL]], LiDia, and [[http://www.4ti2.de/|4ti2]].    .. LattE macchiato is an improved version of LattE, derived from the latest release 1.2. For full functionality either choose the version "LattE, for tea, too", that also installs 4ti2 and other required packages or first install [[http://www.rambau.wm.uni-bayreuth.de/TOPCOM/|TOPCOM]], [[http://www.shoup.net/ntl/|NTL]], LiDia, and [[http://www.4ti2.de/|4ti2]]. 
-  .. Normaliz is a (command line) tool for computations in affine monoids, vector configurations, lattice polytopes, and rational cones. Since version 2.8 it comes with a very fast parallelized algorithm for lattice point enumeration. +   ** [[http://www.kotnet.org/~skimo/barvinok/|barvinok]]\\ by Sven Verdoolaege.
-  ** [[http://www.kotnet.org/~skimo/barvinok/|barvinok]]\\ by Sven Verdoolaege.+
   .. barvinok is a library for counting the number of integer points in parametrized and non-parametrized polytopes. For parametrized polytopes an explicit function in the shape of a piece-wise step-polynomial is constructed. This is a generalization of both Ehrhart quasi-polynomials and vector partition functions.   .. barvinok is a library for counting the number of integer points in parametrized and non-parametrized polytopes. For parametrized polytopes an explicit function in the shape of a piece-wise step-polynomial is constructed. This is a generalization of both Ehrhart quasi-polynomials and vector partition functions.
   .. Rule files using barvinok for the computation of the number of lattice points and the coefficients of the Ehrhart polynomial are currently not part of the standard polymake distribution. They are available as a [[:extensions|separate extension]] to polymake.   .. Rule files using barvinok for the computation of the number of lattice points and the coefficients of the Ehrhart polynomial are currently not part of the standard polymake distribution. They are available as a [[:extensions|separate extension]] to polymake.
  • external_software.txt
  • Last modified: 2022/08/29 15:07
  • by yuruk