# Lenstra-Lenstra-Lovász (LLL) reduction
Transforms a lattice's basis into a form in which the first vector of the basis is not "much" longer than the shortest (non-zero) vector of the lattice:
` ||first basis vector|| <= 2^((n-1)/2) ||shortest vector||`
where `n` is the dimension of lattice (assuming `LOVASZ_FACTOR = 4.0/3.0`).
[LLL Reduction at Wikipedia](https://en.wikipedia.org/wiki/Lenstra%E2%80%93Lenstra%E2%80%93Lov%C3%A1sz_lattice_basis_reduction_algorithm)
# Usage
```rust
use lllreduce::{
Basetype,
gram_schmidt_with_coeffs,
lll_reduce};
fn main() {
let original_mtx : std::vec::Vec<std::vec::Vec::<Basetype>> = vec![
vec![0.0,3.0,4.0,7.0,8.0],
vec![1.0,0.0,1.0,8.0,7.0],
vec![1.0,1.0,3.0,5.0,6.0],
vec![0.0,3.0,4.0,7.0,6.0],
vec![0.0,3.0,4.0,8.0,9.0]
];
let mut mtxtuple = lllreduce::gram_schmidt_with_coeffs(original_mtx);
lll_reduce(&mut mtxtuple);
println!("\tLLL-reduced basis");
for a in &mtxtuple.2 {
println!("\t\t{:?}", a);
}
println!("\tumtx");
for a in &mtxtuple.0 {
println!("\t\t{:?}", a);
}
println!("\tqmtx");
for a in &mtxtuple.1 {
println!("\t\t{:?}", a);
}
}
```
# Note
This is the very first, very drafty version, anything can change in it in the future.