How to Install and Uninstall mld2p4-mpich.i686 Package on Fedora 34
Last updated: November 29,2024
1. Install "mld2p4-mpich.i686" package
In this section, we are going to explain the necessary steps to install mld2p4-mpich.i686 on Fedora 34
$
sudo dnf update
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$
sudo dnf install
mld2p4-mpich.i686
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2. Uninstall "mld2p4-mpich.i686" package
Learn how to uninstall mld2p4-mpich.i686 on Fedora 34:
$
sudo dnf remove
mld2p4-mpich.i686
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$
sudo dnf autoremove
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3. Information about the mld2p4-mpich.i686 package on Fedora 34
Last metadata expiration check: 2:21:55 ago on Tue Sep 6 14:10:38 2022.
Available Packages
Name : mld2p4-mpich
Version : 2.2.2
Release : 8.fc34
Architecture : i686
Size : 475 k
Source : mld2p4-2.2.2-8.fc34.src.rpm
Repository : fedora
Summary : MPICH mld2p4
URL : https://github.com/sfilippone/mld2p4-2
License : BSD
Description : The MULTI-LEVEL DOMAIN DECOMPOSITION PARALLEL PRECONDITIONERS PACKAGE BASED
: ON PSBLAS (MLD2P4) provides multi-level Schwarz preconditioners,
: to be used in the iterative solutions of sparse linear systems:
:
: Ax=b
:
: where $A$ is a square, real or complex, sparse matrix with a symmetric
: sparsity pattern.
: These preconditioners have the following general features:
:
: - both additive and hybrid multilevel variants are implemented, i.e.
: variants that are additive among the levels and inside each level,
: and variants that are multiplicative among the levels and additive inside
: each level; the basic Additive Schwarz (AS) preconditioners are obtained by
: considering only one level;
:
: - a purely algebraic approach is used to generate a sequence of coarse-level
: corrections to a basic AS preconditioner, without explicitly using any
: information on the geometry of the original problem
: (e.g. the discretization of a PDE).
: The smoothed aggregation technique is applied as algebraic coarsening strategy.
Available Packages
Name : mld2p4-mpich
Version : 2.2.2
Release : 8.fc34
Architecture : i686
Size : 475 k
Source : mld2p4-2.2.2-8.fc34.src.rpm
Repository : fedora
Summary : MPICH mld2p4
URL : https://github.com/sfilippone/mld2p4-2
License : BSD
Description : The MULTI-LEVEL DOMAIN DECOMPOSITION PARALLEL PRECONDITIONERS PACKAGE BASED
: ON PSBLAS (MLD2P4) provides multi-level Schwarz preconditioners,
: to be used in the iterative solutions of sparse linear systems:
:
: Ax=b
:
: where $A$ is a square, real or complex, sparse matrix with a symmetric
: sparsity pattern.
: These preconditioners have the following general features:
:
: - both additive and hybrid multilevel variants are implemented, i.e.
: variants that are additive among the levels and inside each level,
: and variants that are multiplicative among the levels and additive inside
: each level; the basic Additive Schwarz (AS) preconditioners are obtained by
: considering only one level;
:
: - a purely algebraic approach is used to generate a sequence of coarse-level
: corrections to a basic AS preconditioner, without explicitly using any
: information on the geometry of the original problem
: (e.g. the discretization of a PDE).
: The smoothed aggregation technique is applied as algebraic coarsening strategy.