How to Install and Uninstall gap-pkg-sonata.noarch Package on Fedora 34
Last updated: November 14,2024
1. Install "gap-pkg-sonata.noarch" package
This guide let you learn how to install gap-pkg-sonata.noarch on Fedora 34
$
sudo dnf update
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$
sudo dnf install
gap-pkg-sonata.noarch
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2. Uninstall "gap-pkg-sonata.noarch" package
This guide let you learn how to uninstall gap-pkg-sonata.noarch on Fedora 34:
$
sudo dnf remove
gap-pkg-sonata.noarch
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$
sudo dnf autoremove
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3. Information about the gap-pkg-sonata.noarch package on Fedora 34
Last metadata expiration check: 2:28:26 ago on Tue Sep 6 02:10:55 2022.
Available Packages
Name : gap-pkg-sonata
Version : 2.9.1
Release : 5.fc34
Architecture : noarch
Size : 746 k
Source : gap-pkg-sonata-2.9.1-5.fc34.src.rpm
Repository : fedora
Summary : GAP package for systems of nearrings
URL : https://gap-packages.github.io/sonata/
License : GPLv2+
Description : SONATA stands for "systems of nearrings and their applications". It
: provides methods for the construction and the analysis of finite
: nearrings. A left nearring is an algebra (N;+,*), where (N,+) is a (not
: necessarily abelian) group, (N,*) is a semigroup, and x*(y+z) = x*y + x*z
: holds for all x,y,z in N.
:
: As a typical example of a nearring, we may consider the set of all
: mappings from a group G into G, where the addition is the pointwise
: addition of mappings in G, and the multiplication is composition of
: functions. If functions are written on the right of their arguments,
: then the left distributive law holds, while the right distributive law
: is not satisfied for non-trivial G.
:
: The SONATA package provides methods for the construction and analysis of
: finite nearrings.
: 1. Methods for constructing all endomorphisms and all fixed-point-free
: automorphisms of a given group.
: 2. Methods for constructing the following nearrings of functions on a
: group G:
: - the nearring of polynomial functions of G (in the sense of
: Lausch-Nöbauer);
: - the nearring of compatible functions of G;
: - distributively generated nearrings such as I(G), A(G), E(G);
: - centralizer nearrings.
: 3. A library of all small nearrings (up to order 15) and all small
: nearrings with identity (up to order 31).
: 4. Functions to obtain solvable fixed-point-free automorphism groups on
: abelian groups, nearfields, planar nearrings, as well as designs from
: those.
: 5. Various functions to study the structure (size, ideals, N-groups, ...)
: of nearrings, to determine properties of nearring elements, and to
: decide whether two nearrings are isomorphic.
: 6. If the package XGAP is installed, the lattices of one- and two-sided
: ideals of a nearring can be studied interactively using a graphical
: representation.
Available Packages
Name : gap-pkg-sonata
Version : 2.9.1
Release : 5.fc34
Architecture : noarch
Size : 746 k
Source : gap-pkg-sonata-2.9.1-5.fc34.src.rpm
Repository : fedora
Summary : GAP package for systems of nearrings
URL : https://gap-packages.github.io/sonata/
License : GPLv2+
Description : SONATA stands for "systems of nearrings and their applications". It
: provides methods for the construction and the analysis of finite
: nearrings. A left nearring is an algebra (N;+,*), where (N,+) is a (not
: necessarily abelian) group, (N,*) is a semigroup, and x*(y+z) = x*y + x*z
: holds for all x,y,z in N.
:
: As a typical example of a nearring, we may consider the set of all
: mappings from a group G into G, where the addition is the pointwise
: addition of mappings in G, and the multiplication is composition of
: functions. If functions are written on the right of their arguments,
: then the left distributive law holds, while the right distributive law
: is not satisfied for non-trivial G.
:
: The SONATA package provides methods for the construction and analysis of
: finite nearrings.
: 1. Methods for constructing all endomorphisms and all fixed-point-free
: automorphisms of a given group.
: 2. Methods for constructing the following nearrings of functions on a
: group G:
: - the nearring of polynomial functions of G (in the sense of
: Lausch-Nöbauer);
: - the nearring of compatible functions of G;
: - distributively generated nearrings such as I(G), A(G), E(G);
: - centralizer nearrings.
: 3. A library of all small nearrings (up to order 15) and all small
: nearrings with identity (up to order 31).
: 4. Functions to obtain solvable fixed-point-free automorphism groups on
: abelian groups, nearfields, planar nearrings, as well as designs from
: those.
: 5. Various functions to study the structure (size, ideals, N-groups, ...)
: of nearrings, to determine properties of nearring elements, and to
: decide whether two nearrings are isomorphic.
: 6. If the package XGAP is installed, the lattices of one- and two-sided
: ideals of a nearring can be studied interactively using a graphical
: representation.