How to Install and Uninstall gap-pkg-semigroups.x86_64 Package on Fedora 34

Last updated: November 20,2024

1. Install "gap-pkg-semigroups.x86_64" package

Please follow the instructions below to install gap-pkg-semigroups.x86_64 on Fedora 34

$ sudo dnf update $ sudo dnf install gap-pkg-semigroups.x86_64

2. Uninstall "gap-pkg-semigroups.x86_64" package

Here is a brief guide to show you how to uninstall gap-pkg-semigroups.x86_64 on Fedora 34:

$ sudo dnf remove gap-pkg-semigroups.x86_64 $ sudo dnf autoremove

3. Information about the gap-pkg-semigroups.x86_64 package on Fedora 34

Last metadata expiration check: 3:03:13 ago on Tue Sep 6 02:10:55 2022.
Available Packages
Name : gap-pkg-semigroups
Version : 3.4.2
Release : 1.fc34
Architecture : x86_64
Size : 694 k
Source : gap-pkg-semigroups-3.4.2-1.fc34.src.rpm
Repository : fedora
Summary : GAP methods for semigroups
URL : http://gap-packages.github.io/Semigroups/
License : GPLv3+
Description : This is a GAP package containing methods for semigroups, monoids, and
: inverse semigroups, principally of transformations, partial
: permutations, bipartitions, subsemigroups of regular Rees 0-matrix
: semigroups, free inverse semigroups, free bands, and semigroups of
: matrices over finite fields.
:
: Semigroups contains more efficient methods than those available in the
: GAP library (and in many cases more efficient than any other software)
: for creating semigroups, monoids, and inverse semigroup, calculating
: their Green's structure, ideals, size, elements, group of units, small
: generating sets, testing membership, finding the inverses of a regular
: element, factorizing elements over the generators, and many more. It is
: also possible to test if a semigroup satisfies a particular property,
: such as if it is regular, simple, inverse, completely regular, and a
: variety of further properties.
:
: There are methods for finding congruences of certain types of
: semigroups, the normalizer of a semigroup in a permutation group, the
: maximal subsemigroups of a finite semigroup, and smaller degree partial
: permutation representations of inverse semigroups. There are functions
: for producing pictures of the Green's structure of a semigroup, and for
: drawing bipartitions.