• LiE

  • Referenced in 165 articles [sw01075]
  • LiE is the name of a software package...
  • SeDuMi

  • Referenced in 1281 articles [sw04002]
  • SeDuMi is a Matlab toolbox for solving optimization...
  • SDPT3

  • Referenced in 703 articles [sw04009]
  • This software is designed to solve conic programming...
  • CVX

  • Referenced in 845 articles [sw04594]
  • CVX is a modeling system for constructing and...
  • Gfan

  • Referenced in 121 articles [sw04698]
  • Gfan is a software package for computing Gröbner...
  • LMIRank

  • Referenced in 35 articles [sw04823]
  • The linear matrix inequality (LMI) problem is a...
  • mctoolbox

  • Referenced in 1486 articles [sw04827]
  • The Matrix Computation Toolbox is a collection of...
  • desing

  • Referenced in 28 articles [sw06228]
  • In this document we present the desing package...
  • Bertini

  • Referenced in 253 articles [sw06683]
  • Bertini™: Software for Numerical Algebraic Geometry. Software for...
  • OEIS

  • Referenced in 4221 articles [sw07248]
  • The On-Line Encyclopedia of Integer Sequence. The...
  • ISOLATE

  • Referenced in 218 articles [sw07741]
  • Efficient isolation of polynomial’s real roots. This...
  • NCAlgebra

  • Referenced in 55 articles [sw07755]
  • NCAlgebra: Our Non Commutative Algebra Packages run under...
  • SF

  • Referenced in 43 articles [sw07774]
  • The SF Package. SF is a package of...
  • NAG4M2

  • Referenced in 14 articles [sw08785]
  • NumericalAlgebraicGeometry -- Numerical Algebraic Geometry. The package NumericalAlgebraicGeometry, also...
  • primdec

  • Referenced in 76 articles [sw10977]
  • Singular library for computing the primary decomposition and...
  • rootsb

  • Referenced in 15 articles [sw11379]
  • Computing common zeros of two bivariate function: r...
  • OPQ

  • Referenced in 442 articles [sw11881]
  • Orthogonal polynomials. Computation and approximation. Orthogonal polynomials are...
  • PieriMaps

  • Referenced in 9 articles [sw12137]
  • Computing inclusions of Schur modules. We describe a...