use na::{geometry::Quaternion, Matrix2, Vector3};
use num_traits::{One, Zero};

#[test]
fn gemm_noncommutative() {
    type Qf64 = Quaternion<f64>;
    let i = Qf64::from_imag(Vector3::new(1.0, 0.0, 0.0));
    let j = Qf64::from_imag(Vector3::new(0.0, 1.0, 0.0));
    let k = Qf64::from_imag(Vector3::new(0.0, 0.0, 1.0));

    let m1 = Matrix2::new(k, Qf64::zero(), j, i);
    // this is the inverse of m1
    let m2 = Matrix2::new(-k, Qf64::zero(), Qf64::one(), -i);

    let mut res: Matrix2<Qf64> = Matrix2::zero();
    res.gemm(Qf64::one(), &m1, &m2, Qf64::zero());
    assert_eq!(res, Matrix2::identity());

    let mut res: Matrix2<Qf64> = Matrix2::identity();
    res.gemm(k, &m1, &m2, -k);
    assert_eq!(res, Matrix2::zero());
}

#[cfg(feature = "arbitrary")]
mod blas_quickcheck {
    use na::{DMatrix, DVector};
    use std::cmp;

    quickcheck! {
        /*
         *
         * Symmetric operators.
         *
         */
        fn gemv_symm(n: usize, alpha: f64, beta: f64) -> bool {
            let n = cmp::max(1, cmp::min(n, 50));
            let a = DMatrix::<f64>::new_random(n, n);
            let a = &a * a.transpose();

            let x = DVector::new_random(n);
            let mut y1 = DVector::new_random(n);
            let mut y2 = y1.clone();

            y1.gemv(alpha, &a, &x, beta);
            y2.sygemv(alpha, &a.lower_triangle(), &x, beta);

            if !relative_eq!(y1, y2, epsilon = 1.0e-10) {
                return false;
            }

            y1.gemv(alpha, &a, &x, 0.0);
            y2.sygemv(alpha, &a.lower_triangle(), &x, 0.0);

            relative_eq!(y1, y2, epsilon = 1.0e-10)
        }

        fn gemv_tr(n: usize, alpha: f64, beta: f64) -> bool {
            let n = cmp::max(1, cmp::min(n, 50));
            let a = DMatrix::<f64>::new_random(n, n);
            let x = DVector::new_random(n);
            let mut y1 = DVector::new_random(n);
            let mut y2 = y1.clone();

            y1.gemv(alpha, &a, &x, beta);
            y2.gemv_tr(alpha, &a.transpose(), &x, beta);

            if !relative_eq!(y1, y2, epsilon = 1.0e-10) {
                return false;
            }

            y1.gemv(alpha, &a, &x, 0.0);
            y2.gemv_tr(alpha, &a.transpose(), &x, 0.0);

            relative_eq!(y1, y2, epsilon = 1.0e-10)
        }

        fn ger_symm(n: usize, alpha: f64, beta: f64) -> bool {
            let n = cmp::max(1, cmp::min(n, 50));
            let a = DMatrix::<f64>::new_random(n, n);
            let mut a1 = &a * a.transpose();
            let mut a2 = a1.lower_triangle();

            let x = DVector::new_random(n);
            let y = DVector::new_random(n);

            a1.ger(alpha, &x, &y, beta);
            a2.syger(alpha, &x, &y, beta);

            if !relative_eq!(a1.lower_triangle(), a2) {
                return false;
            }

            a1.ger(alpha, &x, &y, 0.0);
            a2.syger(alpha, &x, &y, 0.0);

            relative_eq!(a1.lower_triangle(), a2)
        }

        fn quadform(n: usize, alpha: f64, beta: f64) -> bool {
            let n       = cmp::max(1, cmp::min(n, 50));
            let rhs     = DMatrix::<f64>::new_random(6, n);
            let mid     = DMatrix::<f64>::new_random(6, 6);
            let mut res = DMatrix::new_random(n, n);

            let expected = &res * beta + rhs.transpose() * &mid * &rhs * alpha;

            res.quadform(alpha, &mid, &rhs, beta);

            println!("{}{}", res, expected);

            relative_eq!(res, expected, epsilon = 1.0e-7)
        }

        fn quadform_tr(n: usize, alpha: f64, beta: f64) -> bool {
            let n       = cmp::max(1, cmp::min(n, 50));
            let lhs     = DMatrix::<f64>::new_random(6, n);
            let mid     = DMatrix::<f64>::new_random(n, n);
            let mut res = DMatrix::new_random(6, 6);

            let expected = &res * beta + &lhs * &mid * lhs.transpose() * alpha;

            res.quadform_tr(alpha, &lhs, &mid , beta);

            println!("{}{}", res, expected);

            relative_eq!(res, expected, epsilon = 1.0e-7)
        }
    }
}