nalgebra/src/linalg/svd.rs

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#[cfg(feature = "serde-serialize")]
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use serde::{Deserialize, Serialize};
use num_complex::Complex;
use std::ops::MulAssign;
use alga::general::Real;
use allocator::Allocator;
use base::{DefaultAllocator, Matrix, Matrix2x3, MatrixMN, Vector2, VectorN};
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use constraint::{SameNumberOfRows, ShapeConstraint};
use dimension::{Dim, DimDiff, DimMin, DimMinimum, DimSub, U1, U2};
use storage::Storage;
use geometry::UnitComplex;
use linalg::givens;
use linalg::symmetric_eigen;
use linalg::Bidiagonal;
/// Singular Value Decomposition of a general matrix.
#[cfg_attr(feature = "serde-serialize", derive(Serialize, Deserialize))]
#[cfg_attr(
feature = "serde-serialize",
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serde(bound(
serialize = "DefaultAllocator: Allocator<N, R, C> +
Allocator<N, DimMinimum<R, C>> +
Allocator<N, DimMinimum<R, C>, C> +
Allocator<N, R, DimMinimum<R, C>>,
MatrixMN<N, R, DimMinimum<R, C>>: Serialize,
MatrixMN<N, DimMinimum<R, C>, C>: Serialize,
VectorN<N, DimMinimum<R, C>>: Serialize"
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))
)]
#[cfg_attr(
feature = "serde-serialize",
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serde(bound(
deserialize = "DefaultAllocator: Allocator<N, R, C> +
Allocator<N, DimMinimum<R, C>> +
Allocator<N, DimMinimum<R, C>, C> +
Allocator<N, R, DimMinimum<R, C>>,
MatrixMN<N, R, DimMinimum<R, C>>: Deserialize<'de>,
MatrixMN<N, DimMinimum<R, C>, C>: Deserialize<'de>,
VectorN<N, DimMinimum<R, C>>: Deserialize<'de>"
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))
)]
#[derive(Clone, Debug)]
pub struct SVD<N: Real, R: DimMin<C>, C: Dim>
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where DefaultAllocator: Allocator<N, DimMinimum<R, C>, C>
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+ Allocator<N, R, DimMinimum<R, C>>
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+ Allocator<N, DimMinimum<R, C>>
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{
/// The left-singular vectors `U` of this SVD.
pub u: Option<MatrixMN<N, R, DimMinimum<R, C>>>,
/// The right-singular vectors `V^t` of this SVD.
pub v_t: Option<MatrixMN<N, DimMinimum<R, C>, C>>,
/// The singular values of this SVD.
pub singular_values: VectorN<N, DimMinimum<R, C>>,
}
impl<N: Real, R: DimMin<C>, C: Dim> Copy for SVD<N, R, C>
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where
DefaultAllocator: Allocator<N, DimMinimum<R, C>, C>
+ Allocator<N, R, DimMinimum<R, C>>
+ Allocator<N, DimMinimum<R, C>>,
MatrixMN<N, R, DimMinimum<R, C>>: Copy,
MatrixMN<N, DimMinimum<R, C>, C>: Copy,
VectorN<N, DimMinimum<R, C>>: Copy,
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{}
impl<N: Real, R: DimMin<C>, C: Dim> SVD<N, R, C>
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where
DimMinimum<R, C>: DimSub<U1>, // for Bidiagonal.
DefaultAllocator: Allocator<N, R, C>
+ Allocator<N, C>
+ Allocator<N, R>
+ Allocator<N, DimDiff<DimMinimum<R, C>, U1>>
+ Allocator<N, DimMinimum<R, C>, C>
+ Allocator<N, R, DimMinimum<R, C>>
+ Allocator<N, DimMinimum<R, C>>,
{
/// Computes the Singular Value Decomposition of `matrix` using implicit shift.
pub fn new(matrix: MatrixMN<N, R, C>, compute_u: bool, compute_v: bool) -> Self {
Self::try_new(matrix, compute_u, compute_v, N::default_epsilon(), 0).unwrap()
}
/// Attempts to compute the Singular Value Decomposition of `matrix` using implicit shift.
///
/// # Arguments
///
/// * `compute_u` set this to `true` to enable the computation of left-singular vectors.
/// * `compute_v` set this to `true` to enable the computation of left-singular vectors.
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/// * `eps` tolerance used to determine when a value converged to 0.
/// * `max_niter` maximum total number of iterations performed by the algorithm. If this
/// number of iteration is exceeded, `None` is returned. If `niter == 0`, then the algorithm
/// continues indefinitely until convergence.
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pub fn try_new(
mut matrix: MatrixMN<N, R, C>,
compute_u: bool,
compute_v: bool,
eps: N,
max_niter: usize,
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) -> Option<Self>
{
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assert!(
matrix.len() != 0,
"Cannot compute the SVD of an empty matrix."
);
let (nrows, ncols) = matrix.data.shape();
let min_nrows_ncols = nrows.min(ncols);
let dim = min_nrows_ncols.value();
let m_amax = matrix.amax();
if !m_amax.is_zero() {
matrix /= m_amax;
}
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let mut b = Bidiagonal::new(matrix);
let mut u = if compute_u { Some(b.u()) } else { None };
let mut v_t = if compute_v { Some(b.v_t()) } else { None };
let mut niter = 0;
let (mut start, mut end) = Self::delimit_subproblem(&mut b, &mut u, &mut v_t, dim - 1, eps);
while end != start {
let subdim = end - start + 1;
// Solve the subproblem.
if subdim > 2 {
let m = end - 1;
let n = end;
let mut vec;
{
let dm = b.diagonal[m];
let dn = b.diagonal[n];
let fm = b.off_diagonal[m];
let tmm = dm * dm + b.off_diagonal[m - 1] * b.off_diagonal[m - 1];
let tmn = dm * fm;
let tnn = dn * dn + fm * fm;
let shift = symmetric_eigen::wilkinson_shift(tmm, tnn, tmn);
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vec = Vector2::new(
b.diagonal[start] * b.diagonal[start] - shift,
b.diagonal[start] * b.off_diagonal[start],
);
}
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for k in start..n {
let m12 = if k == n - 1 {
N::zero()
} else {
b.off_diagonal[k + 1]
};
let mut subm = Matrix2x3::new(
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b.diagonal[k],
b.off_diagonal[k],
N::zero(),
N::zero(),
b.diagonal[k + 1],
m12,
);
if let Some((rot1, norm1)) = givens::cancel_y(&vec) {
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rot1.conjugate()
.rotate_rows(&mut subm.fixed_columns_mut::<U2>(0));
if k > start {
// This is not the first iteration.
b.off_diagonal[k - 1] = norm1;
}
let v = Vector2::new(subm[(0, 0)], subm[(1, 0)]);
// FIXME: does the case `v.y == 0` ever happen?
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let (rot2, norm2) =
givens::cancel_y(&v).unwrap_or((UnitComplex::identity(), subm[(0, 0)]));
rot2.rotate(&mut subm.fixed_columns_mut::<U2>(1));
subm[(0, 0)] = norm2;
if let Some(ref mut v_t) = v_t {
if b.is_upper_diagonal() {
rot1.rotate(&mut v_t.fixed_rows_mut::<U2>(k));
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} else {
rot2.rotate(&mut v_t.fixed_rows_mut::<U2>(k));
}
}
if let Some(ref mut u) = u {
if b.is_upper_diagonal() {
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rot2.inverse()
.rotate_rows(&mut u.fixed_columns_mut::<U2>(k));
} else {
rot1.inverse()
.rotate_rows(&mut u.fixed_columns_mut::<U2>(k));
}
}
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b.diagonal[k + 0] = subm[(0, 0)];
b.diagonal[k + 1] = subm[(1, 1)];
b.off_diagonal[k + 0] = subm[(0, 1)];
if k != n - 1 {
b.off_diagonal[k + 1] = subm[(1, 2)];
}
vec.x = subm[(0, 1)];
vec.y = subm[(0, 2)];
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} else {
break;
}
}
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} else if subdim == 2 {
// Solve the remaining 2x2 subproblem.
let (u2, s, v2) = Self::compute_2x2_uptrig_svd(
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b.diagonal[start],
b.off_diagonal[start],
b.diagonal[start + 1],
compute_u && b.is_upper_diagonal() || compute_v && !b.is_upper_diagonal(),
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compute_v && b.is_upper_diagonal() || compute_u && !b.is_upper_diagonal(),
);
b.diagonal[start + 0] = s[0];
b.diagonal[start + 1] = s[1];
b.off_diagonal[start] = N::zero();
if let Some(ref mut u) = u {
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let rot = if b.is_upper_diagonal() {
u2.unwrap()
} else {
v2.unwrap()
};
rot.rotate_rows(&mut u.fixed_columns_mut::<U2>(start));
}
if let Some(ref mut v_t) = v_t {
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let rot = if b.is_upper_diagonal() {
v2.unwrap()
} else {
u2.unwrap()
};
rot.inverse().rotate(&mut v_t.fixed_rows_mut::<U2>(start));
}
end -= 1;
}
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// Re-delimit the subproblem in case some decoupling occurred.
let sub = Self::delimit_subproblem(&mut b, &mut u, &mut v_t, end, eps);
start = sub.0;
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end = sub.1;
niter += 1;
if niter == max_niter {
return None;
}
}
b.diagonal *= m_amax;
// Ensure all singular value are non-negative.
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for i in 0..dim {
let sval = b.diagonal[i];
if sval < N::zero() {
b.diagonal[i] = -sval;
if let Some(ref mut u) = u {
u.column_mut(i).neg_mut();
}
}
}
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Some(SVD {
u: u,
v_t: v_t,
singular_values: b.diagonal,
})
}
// Explicit formulaes inspired from the paper "Computing the Singular Values of 2-by-2 Complex
// Matrices", Sanzheng Qiao and Xiaohong Wang.
// http://www.cas.mcmaster.ca/sqrl/papers/sqrl5.pdf
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fn compute_2x2_uptrig_svd(
m11: N,
m12: N,
m22: N,
compute_u: bool,
compute_v: bool,
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) -> (Option<UnitComplex<N>>, Vector2<N>, Option<UnitComplex<N>>)
{
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let two: N = ::convert(2.0f64);
let half: N = ::convert(0.5f64);
let denom = (m11 + m22).hypot(m12) + (m11 - m22).hypot(m12);
// NOTE: v1 is the singular value that is the closest to m22.
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// This prevents cancellation issues when constructing the vector `csv` below. If we chose
// otherwise, we would have v1 ~= m11 when m12 is small. This would cause catastrophic
// cancellation on `v1 * v1 - m11 * m11` below.
let v1 = two * m11 * m22 / denom;
let v2 = half * denom;
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let mut u = None;
let mut v_t = None;
if compute_u || compute_v {
let csv = Vector2::new(m11 * m12, v1 * v1 - m11 * m11).normalize();
if compute_v {
v_t = Some(UnitComplex::new_unchecked(Complex::new(csv.x, csv.y)));
}
if compute_u {
let cu = (m11 * csv.x + m12 * csv.y) / v1;
let su = (m22 * csv.y) / v1;
u = Some(UnitComplex::new_unchecked(Complex::new(cu, su)));
}
}
(u, Vector2::new(v1, v2), v_t)
}
/*
fn display_bidiag(b: &Bidiagonal<N, R, C>, begin: usize, end: usize) {
for i in begin .. end {
for k in begin .. i {
print!(" ");
}
println!("{} {}", b.diagonal[i], b.off_diagonal[i]);
}
for k in begin .. end {
print!(" ");
}
println!("{}", b.diagonal[end]);
}
*/
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fn delimit_subproblem(
b: &mut Bidiagonal<N, R, C>,
u: &mut Option<MatrixMN<N, R, DimMinimum<R, C>>>,
v_t: &mut Option<MatrixMN<N, DimMinimum<R, C>, C>>,
end: usize,
eps: N,
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) -> (usize, usize)
{
let mut n = end;
while n > 0 {
let m = n - 1;
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if b.off_diagonal[m].is_zero()
|| b.off_diagonal[m].abs() <= eps * (b.diagonal[n].abs() + b.diagonal[m].abs())
{
b.off_diagonal[m] = N::zero();
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} else if b.diagonal[m].abs() <= eps {
b.diagonal[m] = N::zero();
Self::cancel_horizontal_off_diagonal_elt(b, u, v_t, m, m + 1);
if m != 0 {
Self::cancel_vertical_off_diagonal_elt(b, u, v_t, m - 1);
}
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} else if b.diagonal[n].abs() <= eps {
b.diagonal[n] = N::zero();
Self::cancel_vertical_off_diagonal_elt(b, u, v_t, m);
} else {
break;
}
n -= 1;
}
if n == 0 {
return (0, 0);
}
let mut new_start = n - 1;
while new_start > 0 {
let m = new_start - 1;
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if b.off_diagonal[m].abs() <= eps * (b.diagonal[new_start].abs() + b.diagonal[m].abs())
{
b.off_diagonal[m] = N::zero();
break;
}
// FIXME: write a test that enters this case.
else if b.diagonal[m].abs() <= eps {
b.diagonal[m] = N::zero();
Self::cancel_horizontal_off_diagonal_elt(b, u, v_t, m, n);
if m != 0 {
Self::cancel_vertical_off_diagonal_elt(b, u, v_t, m - 1);
}
break;
}
new_start -= 1;
}
(new_start, n)
}
// Cancels the i-th off-diagonal element using givens rotations.
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fn cancel_horizontal_off_diagonal_elt(
b: &mut Bidiagonal<N, R, C>,
u: &mut Option<MatrixMN<N, R, DimMinimum<R, C>>>,
v_t: &mut Option<MatrixMN<N, DimMinimum<R, C>, C>>,
i: usize,
end: usize,
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)
{
let mut v = Vector2::new(b.off_diagonal[i], b.diagonal[i + 1]);
b.off_diagonal[i] = N::zero();
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for k in i..end {
if let Some((rot, norm)) = givens::cancel_x(&v) {
b.diagonal[k + 1] = norm;
if b.is_upper_diagonal() {
if let Some(ref mut u) = *u {
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rot.inverse()
.rotate_rows(&mut u.fixed_columns_with_step_mut::<U2>(i, k - i));
}
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} else if let Some(ref mut v_t) = *v_t {
rot.rotate(&mut v_t.fixed_rows_with_step_mut::<U2>(i, k - i));
}
if k + 1 != end {
v.x = -rot.sin_angle() * b.off_diagonal[k + 1];
v.y = b.diagonal[k + 2];
b.off_diagonal[k + 1] *= rot.cos_angle();
}
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} else {
break;
}
}
}
// Cancels the i-th off-diagonal element using givens rotations.
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fn cancel_vertical_off_diagonal_elt(
b: &mut Bidiagonal<N, R, C>,
u: &mut Option<MatrixMN<N, R, DimMinimum<R, C>>>,
v_t: &mut Option<MatrixMN<N, DimMinimum<R, C>, C>>,
i: usize,
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)
{
let mut v = Vector2::new(b.diagonal[i], b.off_diagonal[i]);
b.off_diagonal[i] = N::zero();
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for k in (0..i + 1).rev() {
if let Some((rot, norm)) = givens::cancel_y(&v) {
b.diagonal[k] = norm;
if b.is_upper_diagonal() {
if let Some(ref mut v_t) = *v_t {
rot.rotate(&mut v_t.fixed_rows_with_step_mut::<U2>(k, i - k));
}
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} else if let Some(ref mut u) = *u {
rot.inverse()
.rotate_rows(&mut u.fixed_columns_with_step_mut::<U2>(k, i - k));
}
if k > 0 {
v.x = b.diagonal[k - 1];
v.y = rot.sin_angle() * b.off_diagonal[k - 1];
b.off_diagonal[k - 1] *= rot.cos_angle();
}
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} else {
break;
}
}
}
/// Computes the rank of the decomposed matrix, i.e., the number of singular values greater
/// than `eps`.
pub fn rank(&self, eps: N) -> usize {
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assert!(
eps >= N::zero(),
"SVD rank: the epsilon must be non-negative."
);
self.singular_values.iter().filter(|e| **e > eps).count()
}
/// Rebuild the original matrix.
///
/// This is useful if some of the singular values have been manually modified.
/// Returns `Err` if the right- and left- singular vectors have not been
/// computed at construction-time.
pub fn recompose(self) -> Result<MatrixMN<N, R, C>, &'static str> {
match (self.u, self.v_t) {
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(Some(mut u), Some(v_t)) => {
for i in 0..self.singular_values.len() {
let val = self.singular_values[i];
u.column_mut(i).mul_assign(val);
}
Ok(u * v_t)
}
(None, None) => Err("SVD recomposition: U and V^t have not been computed."),
(None, _) => Err("SVD recomposition: U has not been computed."),
(_, None) => Err("SVD recomposition: V^t has not been computed.")
}
}
/// Computes the pseudo-inverse of the decomposed matrix.
///
/// Any singular value smaller than `eps` is assumed to be zero.
/// Returns `Err` if the right- and left- singular vectors have not
/// been computed at construction-time.
pub fn pseudo_inverse(mut self, eps: N) -> Result<MatrixMN<N, C, R>, &'static str>
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where
DefaultAllocator: Allocator<N, C, R>,
{
if eps < N::zero() {
Err("SVD pseudo inverse: the epsilon must be non-negative.")
}
else {
for i in 0..self.singular_values.len() {
let val = self.singular_values[i];
if val > eps {
self.singular_values[i] = N::one() / val;
} else {
self.singular_values[i] = N::zero();
}
}
self.recompose().map(|m| m.transpose())
}
}
/// Solves the system `self * x = b` where `self` is the decomposed matrix and `x` the unknown.
///
/// Any singular value smaller than `eps` is assumed to be zero.
/// Returns `Err` if the singular vectors `U` and `V` have not been computed.
// FIXME: make this more generic wrt the storage types and the dimensions for `b`.
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pub fn solve<R2: Dim, C2: Dim, S2>(
&self,
b: &Matrix<N, R2, C2, S2>,
eps: N,
) -> Result<MatrixMN<N, C, C2>, &'static str>
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where
S2: Storage<N, R2, C2>,
DefaultAllocator: Allocator<N, C, C2> + Allocator<N, DimMinimum<R, C>, C2>,
ShapeConstraint: SameNumberOfRows<R, R2>,
{
if eps < N::zero() {
Err("SVD solve: the epsilon must be non-negative.")
}
else {
match (&self.u, &self.v_t) {
(Some(u), Some(v_t)) => {
let mut ut_b = u.tr_mul(b);
for j in 0..ut_b.ncols() {
let mut col = ut_b.column_mut(j);
for i in 0..self.singular_values.len() {
let val = self.singular_values[i];
if val > eps {
col[i] /= val;
} else {
col[i] = N::zero();
}
}
}
Ok(v_t.tr_mul(&ut_b))
}
(None, None) => Err("SVD solve: U and V^t have not been computed."),
(None, _) => Err("SVD solve: U has not been computed."),
(_, None) => Err("SVD solve: V^t has not been computed.")
}
}
}
}
impl<N: Real, R: DimMin<C>, C: Dim, S: Storage<N, R, C>> Matrix<N, R, C, S>
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where
DimMinimum<R, C>: DimSub<U1>, // for Bidiagonal.
DefaultAllocator: Allocator<N, R, C>
+ Allocator<N, C>
+ Allocator<N, R>
+ Allocator<N, DimDiff<DimMinimum<R, C>, U1>>
+ Allocator<N, DimMinimum<R, C>, C>
+ Allocator<N, R, DimMinimum<R, C>>
+ Allocator<N, DimMinimum<R, C>>,
{
/// Computes the Singular Value Decomposition using implicit shift.
pub fn svd(self, compute_u: bool, compute_v: bool) -> SVD<N, R, C> {
SVD::new(self.into_owned(), compute_u, compute_v)
}
/// Attempts to compute the Singular Value Decomposition of `matrix` using implicit shift.
///
/// # Arguments
///
/// * `compute_u` set this to `true` to enable the computation of left-singular vectors.
/// * `compute_v` set this to `true` to enable the computation of left-singular vectors.
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/// * `eps` tolerance used to determine when a value converged to 0.
/// * `max_niter` maximum total number of iterations performed by the algorithm. If this
/// number of iteration is exceeded, `None` is returned. If `niter == 0`, then the algorithm
/// continues indefinitely until convergence.
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pub fn try_svd(
self,
compute_u: bool,
compute_v: bool,
eps: N,
max_niter: usize,
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) -> Option<SVD<N, R, C>>
{
SVD::try_new(self.into_owned(), compute_u, compute_v, eps, max_niter)
}
/// Computes the singular values of this matrix.
pub fn singular_values(&self) -> VectorN<N, DimMinimum<R, C>> {
SVD::new(self.clone_owned(), false, false).singular_values
}
/// Computes the rank of this matrix.
///
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/// All singular values below `eps` are considered equal to 0.
pub fn rank(&self, eps: N) -> usize {
let svd = SVD::new(self.clone_owned(), false, false);
svd.rank(eps)
}
/// Computes the pseudo-inverse of this matrix.
///
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/// All singular values below `eps` are considered equal to 0.
pub fn pseudo_inverse(self, eps: N) -> Result<MatrixMN<N, C, R>, &'static str>
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where
DefaultAllocator: Allocator<N, C, R>,
{
SVD::new(self.clone_owned(), true, true).pseudo_inverse(eps)
}
}