How to Install and Uninstall sirocco.i686 Package on Fedora 38
Last updated: November 27,2024
1. Install "sirocco.i686" package
Please follow the instructions below to install sirocco.i686 on Fedora 38
$
sudo dnf update
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$
sudo dnf install
sirocco.i686
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2. Uninstall "sirocco.i686" package
In this section, we are going to explain the necessary steps to uninstall sirocco.i686 on Fedora 38:
$
sudo dnf remove
sirocco.i686
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$
sudo dnf autoremove
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3. Information about the sirocco.i686 package on Fedora 38
Last metadata expiration check: 4:53:25 ago on Sat Mar 16 16:59:57 2024.
Available Packages
Name : sirocco
Version : 2.1.0
Release : 5.fc38
Architecture : i686
Size : 102 k
Source : sirocco-2.1.0-5.fc38.src.rpm
Repository : fedora
Summary : ROot Certified COntinuator
URL : https://github.com/miguelmarco/SIROCCO2
License : GPL-3.0-only
Description : This is a library for computing homotopy continuation of a given root of
: one dimensional sections of bivariate complex polynomials. The output
: is a piecewise linear approximation of the path followed by the root,
: with the property that there is a tubular neighborhood, with square
: transversal section, that contains the actual path, and there is a three
: times thicker tubular neighborhood guaranteed to contain no other root
: of the polynomial. This second property ensures that the piecewise
: linear approximation computed from all roots of a polynomial form a
: topologically correct deformation of the actual braid, since the inner
: tubular neighborhoods cannot intersect.
Available Packages
Name : sirocco
Version : 2.1.0
Release : 5.fc38
Architecture : i686
Size : 102 k
Source : sirocco-2.1.0-5.fc38.src.rpm
Repository : fedora
Summary : ROot Certified COntinuator
URL : https://github.com/miguelmarco/SIROCCO2
License : GPL-3.0-only
Description : This is a library for computing homotopy continuation of a given root of
: one dimensional sections of bivariate complex polynomials. The output
: is a piecewise linear approximation of the path followed by the root,
: with the property that there is a tubular neighborhood, with square
: transversal section, that contains the actual path, and there is a three
: times thicker tubular neighborhood guaranteed to contain no other root
: of the polynomial. This second property ensures that the piecewise
: linear approximation computed from all roots of a polynomial form a
: topologically correct deformation of the actual braid, since the inner
: tubular neighborhoods cannot intersect.
4. References on Fedora 38
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