How to Install and Uninstall gap-pkg-lpres.noarch Package on Fedora 35
Last updated: October 11,2024
1. Install "gap-pkg-lpres.noarch" package
This is a short guide on how to install gap-pkg-lpres.noarch on Fedora 35
$
sudo dnf update
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$
sudo dnf install
gap-pkg-lpres.noarch
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2. Uninstall "gap-pkg-lpres.noarch" package
Please follow the steps below to uninstall gap-pkg-lpres.noarch on Fedora 35:
$
sudo dnf remove
gap-pkg-lpres.noarch
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$
sudo dnf autoremove
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3. Information about the gap-pkg-lpres.noarch package on Fedora 35
Last metadata expiration check: 4:40:42 ago on Wed Sep 7 08:25:01 2022.
Available Packages
Name : gap-pkg-lpres
Version : 1.0.1
Release : 6.fc35
Architecture : noarch
Size : 73 k
Source : gap-pkg-lpres-1.0.1-6.fc35.src.rpm
Repository : fedora
Summary : Nilpotent quotients of L-presented groups
URL : http://gap-packages.github.io/lpres/
License : GPLv2+
Description : The lpres package provides a first construction of finitely L-presented
: groups and a nilpotent quotient algorithm for L-presented groups. The
: features of this package include:
: - creating an L-presented group as a new gap object,
: - computing nilpotent quotients of L-presented groups and epimorphisms
: from the L-presented group onto its nilpotent quotients,
: - computing the abelian invariants of an L-presented group,
: - computing finite-index subgroups and if possible their L-presentation,
: - approximating the Schur multiplier of L-presented groups.
Available Packages
Name : gap-pkg-lpres
Version : 1.0.1
Release : 6.fc35
Architecture : noarch
Size : 73 k
Source : gap-pkg-lpres-1.0.1-6.fc35.src.rpm
Repository : fedora
Summary : Nilpotent quotients of L-presented groups
URL : http://gap-packages.github.io/lpres/
License : GPLv2+
Description : The lpres package provides a first construction of finitely L-presented
: groups and a nilpotent quotient algorithm for L-presented groups. The
: features of this package include:
: - creating an L-presented group as a new gap object,
: - computing nilpotent quotients of L-presented groups and epimorphisms
: from the L-presented group onto its nilpotent quotients,
: - computing the abelian invariants of an L-presented group,
: - computing finite-index subgroups and if possible their L-presentation,
: - approximating the Schur multiplier of L-presented groups.