How to Install and Uninstall gap-pkg-aclib.noarch Package on Fedora 36

Last updated: November 28,2024

1. Install "gap-pkg-aclib.noarch" package

This guide let you learn how to install gap-pkg-aclib.noarch on Fedora 36

$ sudo dnf update $ sudo dnf install gap-pkg-aclib.noarch

2. Uninstall "gap-pkg-aclib.noarch" package

Learn how to uninstall gap-pkg-aclib.noarch on Fedora 36:

$ sudo dnf remove gap-pkg-aclib.noarch $ sudo dnf autoremove

3. Information about the gap-pkg-aclib.noarch package on Fedora 36

Last metadata expiration check: 5:48:20 ago on Thu Sep 8 02:05:26 2022.
Available Packages
Name : gap-pkg-aclib
Version : 1.3.2
Release : 5.fc36
Architecture : noarch
Size : 40 k
Source : gap-pkg-aclib-1.3.2-5.fc36.src.rpm
Repository : fedora
Summary : Almost Crystallographic groups library for GAP
URL : https://gap-packages.github.io/aclib/
License : Artistic 2.0
Description : The AClib package contains a library of almost crystallographic groups
: and some algorithms to compute with these groups. A group is called
: almost crystallographic if it is finitely generated nilpotent-by-finite
: and has no nontrivial finite normal subgroups. Further, an almost
: crystallographic group is called almost Bieberbach if it is
: torsion-free. The almost crystallographic groups of Hirsch length 3 and
: a part of the almost crystallographic groups of Hirsch length 4 have
: been classified by Dekimpe. This classification includes all almost
: Bieberbach groups of Hirsch lengths 3 or 4. The AClib package gives
: access to this classification; that is, the package contains this
: library of groups in a computationally useful form. The groups in this
: library are available in two different representations. First, each of
: the groups of Hirsch length 3 or 4 has a rational matrix representation
: of dimension 4 or 5, respectively, and such representations are
: available in this package. Secondly, all the groups in this library
: are (infinite) polycyclic groups and the package also incorporates
: polycyclic presentations for them. The polycyclic presentations can be
: used to compute with the given groups using the methods of the
: Polycyclic package.