Group :: System/Libraries
RPM: liblevmar
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Current version: 2.6-alt1_12
Build date: 25 february 2023, 11:30 ( 61.0 weeks ago )
Size: 86.36 Kb
Home page: http://www.ics.forth.gr/~lourakis/levmar/
License: GPLv2+
Summary: Levenberg-Marquardt nonlinear least squares algorithm
Description:
List of contributors List of rpms provided by this srpm:
ACL:
Build date: 25 february 2023, 11:30 ( 61.0 weeks ago )
Size: 86.36 Kb
Home page: http://www.ics.forth.gr/~lourakis/levmar/
License: GPLv2+
Summary: Levenberg-Marquardt nonlinear least squares algorithm
Description:
levmar is a native ANSI C implementation of the Levenberg-Marquardt
optimization algorithm. Both unconstrained and constrained (under linear
equations, inequality and box constraints) Levenberg-Marquardt variants are
included. The LM algorithm is an iterative technique that finds a local
minimum of a function that is expressed as the sum of squares of nonlinear
functions. It has become a standard technique for nonlinear least-squares
problems and can be thought of as a combination of steepest descent and the
Gauss-Newton method. When the current solution is far from the correct on,
the algorithm behaves like a steepest descent method: slow, but guaranteed
to converge. When the current solution is close to the correct solution, it
becomes a Gauss-Newton method.
Current maintainer: Igor Vlasenko optimization algorithm. Both unconstrained and constrained (under linear
equations, inequality and box constraints) Levenberg-Marquardt variants are
included. The LM algorithm is an iterative technique that finds a local
minimum of a function that is expressed as the sum of squares of nonlinear
functions. It has become a standard technique for nonlinear least-squares
problems and can be thought of as a combination of steepest descent and the
Gauss-Newton method. When the current solution is far from the correct on,
the algorithm behaves like a steepest descent method: slow, but guaranteed
to converge. When the current solution is close to the correct solution, it
becomes a Gauss-Newton method.
List of contributors List of rpms provided by this srpm:
- liblevmar
- liblevmar-debuginfo
- liblevmar-devel
- liblevmar-devel-debuginfo