Source: latte-int Section: math Priority: optional Maintainer: Debian Math Team Uploaders: Doug Torrance Build-Depends: debhelper-compat (= 13), gnulib, libcdd-dev, libcdd-tools, libgmp-dev, libntl-dev, lrslib, topcom Build-Depends-Indep: texlive-latex-base, texlive-latex-recommended Standards-Version: 4.6.2 Homepage: https://www.math.ucdavis.edu/~latte/software.php Vcs-Browser: https://salsa.debian.org/math-team/latte-int Vcs-Git: https://salsa.debian.org/math-team/latte-int.git Rules-Requires-Root: no Package: latte-int Architecture: any Depends: ${misc:Depends}, ${shlibs:Depends}, libcdd-tools Recommends: latte-int-doc (= ${source:Version}), lrslib, topcom Description: Lattice point Enumeration LattE (Lattice point Enumeration) is a computer software dedicated to the problems of counting lattice points and integration inside convex polytopes. LattE contains the first ever implementation of Barvinok's algorithm. The LattE macchiato version (by M. Köppe) incorporated fundamental improvements and speed ups. . Now the latest version, LattE integrale, has the ability to directly compute integrals of polynomial functions over polytopes and in particular to do exact volume computations. Version 1.6 adds the capability of computing the highest coefficients of weighted Ehrhart quasipolynomials. . This package contains the executable and Maple programs. Package: latte-int-doc Section: doc Architecture: all Multi-Arch: foreign Depends: ${misc:Depends} Description: Lattice point Enumeration (documentation and examples) LattE (Lattice point Enumeration) is a computer software dedicated to the problems of counting lattice points and integration inside convex polytopes. LattE contains the first ever implementation of Barvinok's algorithm. The LattE macchiato version (by M. Köppe) incorporated fundamental improvements and speed ups. . Now the latest version, LattE integrale, has the ability to directly compute integrals of polynomial functions over polytopes and in particular to do exact volume computations. Version 1.6 adds the capability of computing the highest coefficients of weighted Ehrhart quasipolynomials. . This package contains the documentation and examples.