Crates.io | minilp |
lib.rs | minilp |
version | 0.2.2 |
source | src |
created_at | 2020-04-11 20:37:46.986333 |
updated_at | 2020-05-25 10:26:39.544472 |
description | A fast linear programming solver library. |
homepage | |
repository | https://github.com/ztlpn/minilp/ |
max_upload_size | |
id | 228752 |
size | 199,222 |
A fast linear programming solver library.
Linear programming is a technique for finding the minimum (or maximum) of a linear function of a set of continuous variables subject to linear equality and inequality constraints.
Warning: this is an early-stage project. Although the library is already quite powerful and fast, it will probably cycle, lose precision or panic on some harder problems. Please report bugs and contribute code!
Basic usage
use minilp::{Problem, OptimizationDirection, ComparisonOp};
// Maximize an objective function x + 2 * y of two variables x >= 0 and 0 <= y <= 3
let mut problem = Problem::new(OptimizationDirection::Maximize);
let x = problem.add_var(1.0, (0.0, f64::INFINITY));
let y = problem.add_var(2.0, (0.0, 3.0));
// subject to constraints: x + y <= 4 and 2 * x + y >= 2.
problem.add_constraint(&[(x, 1.0), (y, 1.0)], ComparisonOp::Le, 4.0);
problem.add_constraint(&[(x, 2.0), (y, 1.0)], ComparisonOp::Ge, 2.0);
// Optimal value is 7, achieved at x = 1 and y = 3.
let solution = problem.solve().unwrap();
assert_eq!(solution.objective(), 7.0);
assert_eq!(solution[x], 1.0);
assert_eq!(solution[y], 3.0);
For a more involved example, see examples/tsp, a solver for the travelling salesman problem.
This project is licensed under the Apache License, Version 2.0.