forked from M-Labs/nalgebra
needs faster matrix initialization
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@ -149,48 +149,17 @@ where
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/// Given the Cholesky decomposition of a matrix `M`, a scalar `sigma` and a vector `v`,
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/// performs a rank one update such that we end up with the decomposition of `M + sigma * v*v.adjoint()`.
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#[inline]
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pub fn rank_one_update<R2: Dim, S2>(&mut self, x: &Vector<N, R2, S2>, sigma: N::RealField)
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where
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S2: Storage<N, R2, U1>,
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DefaultAllocator: Allocator<N, R2, U1>,
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ShapeConstraint: SameNumberOfRows<R2, D>,
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{
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// heavily inspired by Eigen's `llt_rank_update_lower` implementation https://eigen.tuxfamily.org/dox/LLT_8h_source.html
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let n = x.nrows();
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assert_eq!(
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n,
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self.chol.nrows(),
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"The input vector must be of the same size as the factorized matrix."
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);
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let mut x = x.clone_owned();
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let mut beta = crate::one::<N::RealField>();
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for j in 0..n {
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// updates the diagonal
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let diag = N::real(unsafe { *self.chol.get_unchecked((j, j)) });
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let diag2 = diag * diag;
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let xj = unsafe { *x.get_unchecked(j) };
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let sigma_xj2 = sigma * N::modulus_squared(xj);
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let gamma = diag2 * beta + sigma_xj2;
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let new_diag = (diag2 + sigma_xj2 / beta).sqrt();
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unsafe { *self.chol.get_unchecked_mut((j, j)) = N::from_real(new_diag) };
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beta += sigma_xj2 / diag2;
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// updates the terms of L
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let mut xjplus = x.rows_range_mut(j + 1..);
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let mut col_j = self.chol.slice_range_mut(j + 1.., j);
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// temp_jplus -= (wj / N::from_real(diag)) * col_j;
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xjplus.axpy(-xj / N::from_real(diag), &col_j, N::one());
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if gamma != crate::zero::<N::RealField>() {
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// col_j = N::from_real(nljj / diag) * col_j + (N::from_real(nljj * sigma / gamma) * N::conjugate(wj)) * temp_jplus;
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col_j.axpy(
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N::from_real(new_diag * sigma / gamma) * N::conjugate(xj),
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&xjplus,
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N::from_real(new_diag / diag),
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);
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}
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}
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rank_one_update(&mut self.chol, x, sigma)
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}
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/// Updates the decomposition such that we get the decomposition of a matrix with the given column `c` in the `j`th position.
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/// Updates the decomposition such that we get the decomposition of a matrix with the given column `col` in the `j`th position.
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/// Since the matrix is square, an identical row will be added in the `j`th row.
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pub fn insert_column<R2, S2>(
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self,
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@ -206,37 +175,32 @@ where
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{
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// for an explanation of the formulas, see https://en.wikipedia.org/wiki/Cholesky_decomposition#Updating_the_decomposition
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let n = col.nrows();
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assert_eq!(
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n,
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self.chol.nrows() + 1,
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"The new column must have the size of the factored matrix plus one."
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);
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assert_eq!(n, self.chol.nrows() + 1, "The new column must have the size of the factored matrix plus one.");
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assert!(j < n, "j needs to be within the bound of the new matrix.");
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// TODO what is the fastest way to produce the new matrix ?
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let mut chol= self.chol.clone().insert_column(j, N::zero()).insert_row(j, N::zero());
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// update the jth row
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let top_left_corner = chol.slice_range(..j, ..j);
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let colj_minus = col.rows_range(..j);
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let rowj = top_left_corner.solve_lower_triangular(&colj_minus).unwrap().adjoint(); // TODO both the row and its adjoint seem to be usefull
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chol.slice_range_mut(j, ..j).copy_from(&rowj);
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// TODO
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//println!("dotc:{} norm2:{}", rowj.dotc(&rowj), rowj.norm_squared());
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let top_left_corner = self.chol.slice_range(..j, ..j);
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let col_jminus = col.rows_range(..j);
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let new_rowj_adjoint = top_left_corner.solve_lower_triangular(&col_jminus).expect("Cholesky::insert_column : Unable to solve lower triangular system!");
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new_rowj_adjoint.adjoint_to(&mut chol.slice_range_mut(j, ..j));
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// update the center element
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let center_element = N::sqrt(col[j] - rowj.dotc(&rowj) );
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let center_element = N::sqrt(col[j] - N::from_real(new_rowj_adjoint.norm_squared()));
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chol[(j,j)] = center_element;
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// update the jth column
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let colj_plus = col.rows_range(j+1..);
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let bottom_left_corner = chol.slice_range(j+1.., ..j);
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let colj = (colj_plus - bottom_left_corner*rowj.adjoint()) / center_element; // TODO that can probably be done with a single optimized operation
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chol.slice_range_mut(j+1.., j).copy_from(&colj);
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let bottom_left_corner = self.chol.slice_range(j.., ..j);
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// new_colj = (col_jplus - bottom_left_corner * new_rowj.adjoint()) / center_element;
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let mut new_colj = col.rows_range(j+1..).clone_owned();
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new_colj.gemm(-N::one() / center_element, &bottom_left_corner, &new_rowj_adjoint, N::one() / center_element );
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chol.slice_range_mut(j+1.., j).copy_from(&new_colj);
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// update the bottom right corner
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let mut bottom_right_corner = chol.slice_range_mut(j+1.., j+1..);
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rank_one_update_helper(&mut bottom_right_corner, &colj, -N::real(N::one()));
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rank_one_update(&mut bottom_right_corner, &new_colj, -N::real(N::one()));
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Cholesky { chol }
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}
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@ -254,13 +218,14 @@ where
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let n = self.chol.nrows();
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assert!(n > 0, "The matrix needs at least one column.");
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assert!(j < n, "j needs to be within the bound of the matrix.");
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// TODO what is the fastest way to produce the new matrix ?
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let mut chol= self.chol.clone().remove_column(j).remove_row(j);
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// updates the bottom right corner
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let mut corner = chol.slice_range_mut(j.., j..);
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let colj = self.chol.slice_range(j+1.., j);
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rank_one_update_helper(&mut corner, &colj, N::real(N::one()));
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let mut bottom_right_corner = chol.slice_range_mut(j.., j..);
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let old_colj = self.chol.slice_range(j+1.., j);
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rank_one_update(&mut bottom_right_corner, &old_colj, N::real(N::one()));
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Cholesky { chol }
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}
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@ -281,7 +246,10 @@ where
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/// Given the Cholesky decomposition of a matrix `M`, a scalar `sigma` and a vector `v`,
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/// performs a rank one update such that we end up with the decomposition of `M + sigma * v*v.adjoint()`.
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fn rank_one_update_helper<N, D, S, Rx, Sx>(chol : &mut Matrix<N, D, D, S>, x: &Vector<N, Rx, Sx>, sigma: N::RealField)
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///
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/// This helper method is calling for by `rank_one_update` but also `insert_column` and `remove_column`
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/// where it is used on a square slice of the decomposition
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fn rank_one_update<N, D, S, Rx, Sx>(chol : &mut Matrix<N, D, D, S>, x: &Vector<N, Rx, Sx>, sigma: N::RealField)
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where
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N: ComplexField,
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D: Dim,
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