A sparse implementation of a binary matrix optimized for row operations.
All elements in a binary matrix are element of the binary field GF2. That is, they are either 0 or 1 and addition is modulo 2.
To instanciate a matrix, you need to specify the number of columns as well as the position of 1 in each rows.
use sparse_bin_mat::SparseBinMat;
// This is the matrix
// 1 0 1 0 1
// 0 1 0 1 0
// 0 0 1 0 0
let matrix = SparseBinMat::new(5, vec![vec![0, 2, 4], vec![1, 3], vec![2]]);
It is easy to access elements or rows of a matrix. However, since the matrix are optimized for row operations, you need to transpose the matrix if you want to perform column operations.
let matrix = SparseBinMat::new(5, vec![vec![0, 2, 4], vec![1, 3], vec![2]]);
assert_eq!(matrix.row(1), Some([1, 3].as_ref()));
assert_eq!(matrix.get(0, 0), Some(1));
assert_eq!(matrix.get(0, 1), Some(0));
// The element (0, 7) is out of bound for a 3 x 5 matrix.
assert_eq!(matrix.get(0, 7), None);
Adition and multiplication are implemented between matrix references.
let matrix = SparseBinMat::new(3, vec![vec![0, 1], vec![1, 2], vec![0, 2]]);
let identity = SparseBinMat::identity(3);
let sum = SparseBinMat::new(3, vec![vec![1], vec![2], vec![0]]);
assert_eq!(&matrix + &identity, sum);
assert_eq!(&matrix * &identity, matrix);
Many useful operations and decompositions are implemented. These include, but are not limited to
Operations are implemented as I need them, feel welcome to raise an issue if you need a new functionnality.