GNU Linear Programming Kit

The GNU Linear Programming Kit (GLPK) is a software package intended for solving large-scale linear programming (LP), mixed integer programming (MIP), and other related problems. It is a set of routines written in ANSI C and organized in the form of a callable library. The package is part of the GNU Project and is released under the GNU General Public License.

GNU Linear Programming Kit
Original author(s)Andrew O. Makhorin
Developer(s)GNU Project
Stable release
4.65 / 16 February 2018 (2018-02-16)
Repository
Written inC
Operating systemCross-platform
Available inEnglish
LicenseGPLv3
Websitewww.gnu.org/software/glpk/

Problems can be modeled in the language GNU MathProg (previously known as GMPL) which shares many parts of the syntax with AMPL and solved with standalone solver GLPSOL.

GLPK can also be used as a C library.

GLPK uses the revised simplex method and the primal-dual interior point method for non-integer problems and the branch-and-bound algorithm together with Gomory's mixed integer cuts for (mixed) integer problems.

GLPK is supported in the free edition of the OptimJ modeling system

An independent project provides a Java-based interface to GLPK (via JNI).[1] This allows Java applications to call out to GLPK in a relatively transparent manner.

History

GLPK was developed by Andrew O. Makhorin (Андрей Олегович Махорин) of the Moscow Aviation Institute. The first public release was in October 2000.

  • Version 1.1.1 contained a library for a revised primal and dual simplex algorithm.
  • Version 2.0 introduced an implementation of the primal-dual interior point method.
  • Version 2.2 added branch and bound solving of mixed integer problems.
  • Version 2.4 added a first implementation of the GLPK/L modeling language.
  • Version 4.0 replaced GLPK/L by the GNU MathProg modeling language, which is a subset of the AMPL modeling language.
gollark: I write documentation for the new one!
gollark: https://wiki.computercraft.cc/Http.websocket
gollark: CC:**T** does.
gollark: > why not include it? it seems like a reasonable inclusion.It would be complex and probably lead to endless bikeshedding.
gollark: You have to deal with trusting a server and maybe key distribution and stuff.

References

Further reading

  • Eiji Oki (2012). Linear Programming and Algorithms for Communication Networks: A Practical Guide to Network Design, Control, and Management. CRC Press. ISBN 978-1-4665-5264-7. The book uses GLPK exclusively and contains numerous examples.
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