How to Install and Uninstall gap-aclib Package on Kali Linux
Last updated: April 16,2024
1. Install "gap-aclib" package
In this section, we are going to explain the necessary steps to install gap-aclib on Kali Linux
$
sudo apt update
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$
sudo apt install
gap-aclib
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2. Uninstall "gap-aclib" package
Learn how to uninstall gap-aclib on Kali Linux:
$
sudo apt remove
gap-aclib
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$
sudo apt autoclean && sudo apt autoremove
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3. Information about the gap-aclib package on Kali Linux
Package: gap-aclib
Version: 1.3.2-4
Installed-Size: 625
Maintainer: Joachim Zobel
Architecture: all
Provides: gap-pkg-aclib
Depends: gap-polycyclic (>= 1.0), gap-alnuth (>= 3.0)
Recommends: gap
Suggests: gap-crystcat
Size: 229508
SHA256: b1255e43ea35987d1a8c55b0f4cb556faac8351bae404b75e7f6092541f581a8
SHA1: c8ec028ea1b22f909fa3f0d1835bdd5c84b62aa0
MD5sum: f43006169a89894e08313fa6bd12a9de
Description: GAP AClib - Almost Crystallographic Groups - A Library and Algorithms
GAP is a system for computational discrete algebra, with particular emphasis
on Computational Group Theory. GAP provides a programming language, a library
of thousands of functions implementing algebraic algorithms written in the GAP
language as well as large data libraries of algebraic objects. GAP is used in
research and teaching for studying groups and their representations, rings,
vector spaces, algebras, combinatorial structures, and more.
.
The AClib package contains a library of almost crystallographic groups and a
some algorithms to compute with these groups. A group is called almost
crystallographic if it is finitely generated nilpotent-by-finite and has no
non-trivial 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
cyrstallographic 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 libraray 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.
The package was written by Karel Dekimpe and Bettina Eick.
Description-md5:
Multi-Arch: foreign
Homepage: https://www.gap-system.org/Packages/aclib.html
Section: math
Priority: optional
Filename: pool/main/g/gap-aclib/gap-aclib_1.3.2-4_all.deb
Version: 1.3.2-4
Installed-Size: 625
Maintainer: Joachim Zobel
Architecture: all
Provides: gap-pkg-aclib
Depends: gap-polycyclic (>= 1.0), gap-alnuth (>= 3.0)
Recommends: gap
Suggests: gap-crystcat
Size: 229508
SHA256: b1255e43ea35987d1a8c55b0f4cb556faac8351bae404b75e7f6092541f581a8
SHA1: c8ec028ea1b22f909fa3f0d1835bdd5c84b62aa0
MD5sum: f43006169a89894e08313fa6bd12a9de
Description: GAP AClib - Almost Crystallographic Groups - A Library and Algorithms
GAP is a system for computational discrete algebra, with particular emphasis
on Computational Group Theory. GAP provides a programming language, a library
of thousands of functions implementing algebraic algorithms written in the GAP
language as well as large data libraries of algebraic objects. GAP is used in
research and teaching for studying groups and their representations, rings,
vector spaces, algebras, combinatorial structures, and more.
.
The AClib package contains a library of almost crystallographic groups and a
some algorithms to compute with these groups. A group is called almost
crystallographic if it is finitely generated nilpotent-by-finite and has no
non-trivial 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
cyrstallographic 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 libraray 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.
The package was written by Karel Dekimpe and Bettina Eick.
Description-md5:
Multi-Arch: foreign
Homepage: https://www.gap-system.org/Packages/aclib.html
Section: math
Priority: optional
Filename: pool/main/g/gap-aclib/gap-aclib_1.3.2-4_all.deb
4. References on Kali Linux
5. The same packages on other Linux Distributions
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