use format::{Conventional, Diagonal};
use operation::{MultiplySelf, Transpose};
use {Element, Number};
#[cfg(feature = "acceleration")]
mod acceleration;
impl<T> MultiplySelf<Diagonal<T>> for Conventional<T>
where
T: Element + Number,
{
#[inline]
fn multiply_self(&mut self, right: &Diagonal<T>) {
let (rows, insides, columns) = (self.rows, self.columns, right.columns);
debug_assert_eq!(insides, right.rows);
self.resize((rows, columns));
for j in 0..insides {
let factor = right[j];
for i in 0..rows {
self[(i, j)] = factor * self[(i, j)];
}
}
}
}
impl<T: Element> Transpose for Conventional<T> {
fn transpose(&self) -> Self {
let (rows, columns) = (self.rows, self.columns);
let mut matrix = Conventional::new((columns, rows));
for i in 0..rows {
for j in 0..columns {
matrix.values[i * columns + j] = self.values[j * rows + i];
}
}
matrix
}
}
#[cfg(test)]
mod tests {
use prelude::*;
#[test]
fn multiply_self() {
let mut matrix = Conventional::from_vec(
(3, 2),
matrix![
1.0, 4.0;
2.0, 5.0;
3.0, 6.0;
],
);
let right = Diagonal::from_vec((2, 4), vec![2.0, 3.0]);
matrix.multiply_self(&right);
assert_eq!(
&*matrix,
&*matrix![
2.0, 12.0, 0.0, 0.0;
4.0, 15.0, 0.0, 0.0;
6.0, 18.0, 0.0, 0.0;
]
);
}
#[test]
fn transpose() {
let matrix = Conventional::from_vec(
(3, 2),
matrix![
1.0, 4.0;
2.0, 5.0;
3.0, 6.0;
],
);
assert_eq!(
matrix.transpose(),
Conventional::from_vec(
(2, 3),
matrix![
1.0, 2.0, 3.0;
4.0, 5.0, 6.0;
],
)
);
}
}