How to Install and Uninstall gap-smallgrp-extra Package on Ubuntu 21.04 (Hirsute Hippo)
Last updated: November 23,2024
1. Install "gap-smallgrp-extra" package
This guide covers the steps necessary to install gap-smallgrp-extra on Ubuntu 21.04 (Hirsute Hippo)
$
sudo apt update
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$
sudo apt install
gap-smallgrp-extra
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2. Uninstall "gap-smallgrp-extra" package
Please follow the instructions below to uninstall gap-smallgrp-extra on Ubuntu 21.04 (Hirsute Hippo):
$
sudo apt remove
gap-smallgrp-extra
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$
sudo apt autoclean && sudo apt autoremove
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3. Information about the gap-smallgrp-extra package on Ubuntu 21.04 (Hirsute Hippo)
Package: gap-smallgrp-extra
Architecture: all
Version: 1.4.1-2
Priority: optional
Section: universe/math
Source: gap-smallgrp
Origin: Ubuntu
Maintainer: Ubuntu Developers
Original-Maintainer: Bill Allombert
Bugs: https://bugs.launchpad.net/ubuntu/+filebug
Installed-Size: 13304
Provides: gap-pkg-smallgrp
Depends: gap-smallgrp
Filename: pool/universe/g/gap-smallgrp/gap-smallgrp-extra_1.4.1-2_all.deb
Size: 12462244
MD5sum: 332e5bc58d72acfaaa29c9aa758fab7d
SHA1: c66fe74583a613354f7406b8466668d204515444
SHA256: 61ec06768843abb78d13fae2ab51ecd6de820ec7fe8b7a9fdb96035d5d77d21b
SHA512: 833adaa762dd19bb710f61a070a385ce62a0c8983accdf635fd565fee5d285d8e5378e00e5b0ff7b77a31ee8b3cd913acd429d9aa4273a94b86ea9a914e3480a
Homepage: https://www.gap-system.org/Packages/smallgrp.html
Description-en: GAP SmallGrp - The GAP Small Groups Library
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 GAP Small Groups Library is a catalogue of groups of `small' order.
This package contains the groups data and identification routines for groups
.
* of order at most 2000 except 1024.
* of cubefree order at most 50 000.
* of order p^n for n <= 6 and all primes p.
* of squarefree order.
* whose order factorises in at most 3 primes.
* of order q^n * p for q^n dividing 2^8, 3^6, 5^5, 7^4 and p prime
different to q
* of order p^7 with p = 3,5,7,11.
.
The Small Groups Library provides access to these groups and a method to
identify the catalogue number of a given group.
Description-md5: c410f9ea89b308b077da461b948e4274
Architecture: all
Version: 1.4.1-2
Priority: optional
Section: universe/math
Source: gap-smallgrp
Origin: Ubuntu
Maintainer: Ubuntu Developers
Original-Maintainer: Bill Allombert
Bugs: https://bugs.launchpad.net/ubuntu/+filebug
Installed-Size: 13304
Provides: gap-pkg-smallgrp
Depends: gap-smallgrp
Filename: pool/universe/g/gap-smallgrp/gap-smallgrp-extra_1.4.1-2_all.deb
Size: 12462244
MD5sum: 332e5bc58d72acfaaa29c9aa758fab7d
SHA1: c66fe74583a613354f7406b8466668d204515444
SHA256: 61ec06768843abb78d13fae2ab51ecd6de820ec7fe8b7a9fdb96035d5d77d21b
SHA512: 833adaa762dd19bb710f61a070a385ce62a0c8983accdf635fd565fee5d285d8e5378e00e5b0ff7b77a31ee8b3cd913acd429d9aa4273a94b86ea9a914e3480a
Homepage: https://www.gap-system.org/Packages/smallgrp.html
Description-en: GAP SmallGrp - The GAP Small Groups Library
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 GAP Small Groups Library is a catalogue of groups of `small' order.
This package contains the groups data and identification routines for groups
.
* of order at most 2000 except 1024.
* of cubefree order at most 50 000.
* of order p^n for n <= 6 and all primes p.
* of squarefree order.
* whose order factorises in at most 3 primes.
* of order q^n * p for q^n dividing 2^8, 3^6, 5^5, 7^4 and p prime
different to q
* of order p^7 with p = 3,5,7,11.
.
The Small Groups Library provides access to these groups and a method to
identify the catalogue number of a given group.
Description-md5: c410f9ea89b308b077da461b948e4274