lp-solve 5.5.2.5-2build4 source package in Ubuntu
Changelog
lp-solve (5.5.2.5-2build4) noble; urgency=high * No change rebuild for 64-bit time_t and frame pointers. -- Julian Andres Klode <email address hidden> Mon, 08 Apr 2024 18:11:37 +0200
Upload details
- Uploaded by:
- Julian Andres Klode
- Uploaded to:
- Noble
- Original maintainer:
- Ubuntu Developers
- Architectures:
- any all
- Section:
- math
- Urgency:
- Very Urgent
See full publishing history Publishing
Series | Published | Component | Section | |
---|---|---|---|---|
Oracular | release | main | math | |
Noble | release | main | math |
Downloads
File | Size | SHA-256 Checksum |
---|---|---|
lp-solve_5.5.2.5.orig-doc.tar.gz | 1.4 MiB | 4c6085a7083cca04c18876a1c8838ae2427b97080219fffedde1c3a96bc13561 |
lp-solve_5.5.2.5.orig.tar.gz | 793.9 KiB | 201a7c62b8b3360c884ee2a73ed7667e5716fc1e809755053b398c2f5b0cf28a |
lp-solve_5.5.2.5-2build4.debian.tar.xz | 16.2 KiB | ca46cb841c46fd732153f26801bec285cea33c8264de9077cf2febc7d9bdeeb3 |
lp-solve_5.5.2.5-2build4.dsc | 2.3 KiB | 5e05d46d1066a40b7bbcf8d828521eb4ea79a5862b2bee879d9a3e1fdf04a870 |
Available diffs
- diff from 5.5.2.5-2build3 to 5.5.2.5-2build4 (344 bytes)
Binary packages built by this source
- liblpsolve55-dev: Solve (mixed integer) linear programming problems - library
The linear programming (LP) problem can be formulated as: Solve A.x >=
V1, with V2.x maximal. A is a matrix, x is a vector of (nonnegative)
variables, V1 is a vector called the right hand side, and V2 is a vector
specifying the objective function.
.
An integer linear programming (ILP) problem is an LP with the
constraint that all the variables are integers. In a mixed integer
linear programming (MILP) problem, some of the variables are integer
and others are real.
.
The program lp_solve solves LP, ILP, and MILP problems. It is slightly
more general than suggested above, in that every row of A (specifying
one constraint) can have its own (in)equality, <=, >= or =. The result
specifies values for all variables.
.
lp_solve uses the 'Simplex' algorithm and sparse matrix methods for
pure LP problems. If one or more of the variables is declared
integer, the Simplex algorithm is iterated with a branch and bound
algorithm, until the desired optimal solution is found. lp_solve can
read MPS format input files.
.
This package contains the static library for developing programs using
liblpsolve.
- lp-solve: Solve (mixed integer) linear programming problems
The linear programming (LP) problem can be formulated as: Solve A.x >=
V1, with V2.x maximal. A is a matrix, x is a vector of (nonnegative)
variables, V1 is a vector called the right hand side, and V2 is a vector
specifying the objective function.
.
An integer linear programming (ILP) problem is an LP with the
constraint that all the variables are integers. In a mixed integer
linear programming (MILP) problem, some of the variables are integer
and others are real.
.
The program lp_solve solves LP, ILP, and MILP problems. It is slightly
more general than suggested above, in that every row of A (specifying
one constraint) can have its own (in)equality, <=, >= or =. The result
specifies values for all variables.
.
lp_solve uses the 'Simplex' algorithm and sparse matrix methods for
pure LP problems. If one or more of the variables is declared
integer, the Simplex algorithm is iterated with a branch and bound
algorithm, until the desired optimal solution is found. lp_solve can
read MPS format input files.
- lp-solve-dbgsym: debug symbols for lp-solve
- lp-solve-doc: Solve (mixed integer) linear programming problems - documentation
The linear programming (LP) problem can be formulated as: Solve A.x >=
V1, with V2.x maximal. A is a matrix, x is a vector of (nonnegative)
variables, V1 is a vector called the right hand side, and V2 is a vector
specifying the objective function.
.
An integer linear programming (ILP) problem is an LP with the
constraint that all the variables are integers. In a mixed integer
linear programming (MILP) problem, some of the variables are integer
and others are real.
.
The program lp_solve solves LP, ILP, and MILP problems. It is slightly
more general than suggested above, in that every row of A (specifying
one constraint) can have its own (in)equality, <=, >= or =. The result
specifies values for all variables.
.
lp_solve uses the 'Simplex' algorithm and sparse matrix methods for
pure LP problems. If one or more of the variables is declared
integer, the Simplex algorithm is iterated with a branch and bound
algorithm, until the desired optimal solution is found. lp_solve can
read MPS format input files.
.
This package contains the documentation for the lp_solve program and
the library.