nalgebra/tests/linalg/bidiagonal.rs

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#![cfg(feature = "arbitrary")]
use na::{DMatrix, Matrix2, Matrix4, Matrix5x3, Matrix3x5};
quickcheck! {
fn bidiagonal(m: DMatrix<f64>) -> bool {
if m.len() == 0 {
return true;
}
let bidiagonal = m.clone().bidiagonalize();
let (u, d, v_t) = bidiagonal.unpack();
println!("{}{}{}", &u, &d, &v_t);
println!("{:.7}{:.7}", &u * &d * &v_t, m);
relative_eq!(m, &u * d * &v_t, epsilon = 1.0e-7)
}
fn bidiagonal_static_5_3(m: Matrix5x3<f64>) -> bool {
let bidiagonal = m.bidiagonalize();
let (u, d, v_t) = bidiagonal.unpack();
println!("{}{}{}", &u, &d, &v_t);
println!("{:.7}{:.7}", &u * &d * &v_t, m);
relative_eq!(m, &u * d * &v_t, epsilon = 1.0e-7)
}
fn bidiagonal_static_3_5(m: Matrix3x5<f64>) -> bool {
let bidiagonal = m.bidiagonalize();
let (u, d, v_t) = bidiagonal.unpack();
println!("{}{}{}", &u, &d, &v_t);
println!("{:.7}{:.7}", &u * &d * &v_t, m);
relative_eq!(m, &u * d * &v_t, epsilon = 1.0e-7)
}
fn bidiagonal_static_square(m: Matrix4<f64>) -> bool {
let bidiagonal = m.bidiagonalize();
let (u, d, v_t) = bidiagonal.unpack();
println!("{}{}{}", &u, &d, &v_t);
println!("{:.7}{:.7}", &u * &d * &v_t, m);
relative_eq!(m, &u * d * &v_t, epsilon = 1.0e-7)
}
fn bidiagonal_static_square_2x2(m: Matrix2<f64>) -> bool {
let bidiagonal = m.bidiagonalize();
let (u, d, v_t) = bidiagonal.unpack();
println!("{}{}{}", &u, &d, &v_t);
println!("{:.7}{:.7}", &u * &d * &v_t, m);
relative_eq!(m, &u * d * &v_t, epsilon = 1.0e-7)
}
}