How to Install and Uninstall singular Package on openSUSE Leap
Last updated: November 22,2024
1. Install "singular" package
This is a short guide on how to install singular on openSUSE Leap
$
sudo zypper refresh
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$
sudo zypper install
singular
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2. Uninstall "singular" package
Please follow the guidance below to uninstall singular on openSUSE Leap:
$
sudo zypper remove
singular
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3. Information about the singular package on openSUSE Leap
Information for package singular:
---------------------------------
Repository : Main Repository
Name : singular
Version : 4.3.1-bp155.1.5
Arch : x86_64
Vendor : openSUSE
Installed Size : 14.1 MiB
Installed : No
Status : not installed
Source package : singular-4.3.1-bp155.1.5.src
Upstream URL : https://www.singular.uni-kl.de/
Summary : Singular CAS
Description :
Singular is a computer algebra system for polynomial computations,
with special emphasis on commutative and non-commutative algebra,
algebraic geometry, and singularity theory.
Its main computational objects are ideals, modules and matrices over
a large number of baserings. These include
* polynomial rings over various ground fields and some rings
(including the integers),
* localizations of the above,
* a general class of non-commutative algebras (including the exterior
algebra and the Weyl algebra),
* quotient rings of the above,
* tensor products of the above.
Singular's core algorithms handle
* Gröbner resp. standard bases and free resolutions,
* polynomial factorization,
* resultants, characteristic sets, and numerical root finding.
---------------------------------
Repository : Main Repository
Name : singular
Version : 4.3.1-bp155.1.5
Arch : x86_64
Vendor : openSUSE
Installed Size : 14.1 MiB
Installed : No
Status : not installed
Source package : singular-4.3.1-bp155.1.5.src
Upstream URL : https://www.singular.uni-kl.de/
Summary : Singular CAS
Description :
Singular is a computer algebra system for polynomial computations,
with special emphasis on commutative and non-commutative algebra,
algebraic geometry, and singularity theory.
Its main computational objects are ideals, modules and matrices over
a large number of baserings. These include
* polynomial rings over various ground fields and some rings
(including the integers),
* localizations of the above,
* a general class of non-commutative algebras (including the exterior
algebra and the Weyl algebra),
* quotient rings of the above,
* tensor products of the above.
Singular's core algorithms handle
* Gröbner resp. standard bases and free resolutions,
* polynomial factorization,
* resultants, characteristic sets, and numerical root finding.