Questions tagged [numerical-linear-algebra]
{numerical-linear-algebra} questions involving algorithms for linear algebra computations.
278
questions
0
votes
1
answer
81
views
Substitution vs elimination in solving system of linear equations [closed]
I believe that elimination is generally the preferred method to solve a system of linear equations compared with substitution.
To be precise, by substitution method on a system of linear equations, it ...
1
vote
1
answer
48
views
Characterization of the behavior of the residuals in conjugate gradient
In conjugate gradient method for solving symmetric positive definite linear system $Ax=b$, which can also be regarded as a convex optimization problem $\dfrac{1}{2} x'Ax - x'b$, the $A$-norm of the ...
1
vote
0
answers
39
views
QR algorithm for eigenvalues and eigenvectors of large symmetric matrices
I am trying to write a QR algorithm in Python for eigenvectors and eigenvalues finding for large symmetric matrices,
My initial thought was to use Householder transformation with a Wilkinson shift ...
30
votes
3
answers
2k
views
Quickly determining if a matrix has any PSD completion
Given $m$ entries of an $n \times n$ matrix, is it possible to determine in $O(m n)$ time whether there is any positive semidefinite completion?
Slightly more precisely: for simplicity let's assume ...
3
votes
0
answers
78
views
Efficient way to calculate Smith Normal Form of large integer matrices
I am interested in calculating the Smith Normal Form for Laplacian matrices of hypercube graphs. Using the elementary divisors method from SAGE, I was able calculate up to the 11-cube (which has a $2^{...
1
vote
0
answers
47
views
Generalized eigenvalues of block matrix
Let $A, D \in \mathbb{R}^{n\times n}$ be symmetric matrices and consider the following matrix pencil
$$
\begin{pmatrix}
-I & A+\lambda I \\
A+\lambda I & -D \\
\end{pmatrix}
$$
If we already ...
3
votes
0
answers
115
views
efficient numerical algorithm for matrix determinant
It appears that in numerical analysis the question of computing the determinant $\det A$ of a real or a complex $n\times n$ matrix $A$ is not well-studied, and a usual recommendation is to use matrix ...
2
votes
1
answer
63
views
Linear system with sum of Kronecker products
Here and here, specific ways to address the equation in $x$, for $N=2$, are given:
$$\sum_{i=1}^N (A_i\otimes B_i)x=c$$
Is anything know about the case $N>2$?
I am looking in fact for an efficient ...
29
votes
2
answers
745
views
Gaussian elimination is just Gram-Schmidt with a change to the inner product symbol?
I noticed at some point that if you take the Gram-Schmidt algorithm for taking the QR decomposition of a matrix, and you change the meaning of the inner product symbol $\langle \mathbf u, \mathbf v \...
3
votes
1
answer
96
views
Complexity of inverting and multiplying against a symmetric Toeplitz matrix with two repeated entries
I know that the computational complexity of inverting a general $n \times n$ matrix $A$ is $O(n^{2.373})$ and multiplying it against an $n \times m$ matrix is $O(n^2m)$. Moreover, I've seen that ...
0
votes
0
answers
32
views
The backward error of tridiagonal linear system $Ax=b$ by Gaussian elimination without pivoting
Let $A$ be an $n \times n$ nonsingular tridiagonal matrix having an $LU$
factorization. It can be shown that the computed solution of the linear system
$Ax = b$ using Gaussian elimination without ...
1
vote
0
answers
12
views
Optimal Truncation of LDL-factorization to improve conditioning
Suppose I factored real symmetric quasi-definite $ A_0= L_0 \cdot D_0 \cdot L_0^T$ and the factorization exists, with $D$ diagonal and $L$ unit lower-triangular; and suppose $L$ and $D$ are badly ...
1
vote
0
answers
30
views
Slope assertion in Cholesky on digital computers
For a real symmetric positive definite linear system
$$ A \cdot x = b, $$
solved using Choelsky with forward- and backward-substitution, we know it for the numerical approximation $\tilde{x}$ to $x$ ...
3
votes
2
answers
106
views
Practical symmetric equivalent to QR factorization updates
As we know, the QR-factorization $Q\cdot R=A$ of any real symmetric $n \times n$ matrix $A$ with full rank is unconditionally numerically stable. Further, when A is rank-1-updated, the factorization ...
6
votes
2
answers
383
views
Spectrum of operator involving ladder operators
The ladder operator in quantum mechanics are the operators
$$a^\dagger \ = \ \frac{1}{\sqrt{2}} \left(-\frac{d}{dq} + q\right)$$
and
$$a \ \ = \ \frac{1}{\sqrt{2}} \left(\ \ \ \!\frac{d}{dq} + q\...
0
votes
0
answers
30
views
Testing a condition in linear algebra involving Krylov subspaces
Let $A \in \mathcal{M}_n(\mathbb{R})$ be a real-valued $n \times n$ matrix.
For $b \in \mathbb{R}^n$, I consider the Krylov subspace
$$K_A(b) = \operatorname{span} \{ b, A b, \dotsc, A^{n-1} b \}.$$
...
1
vote
1
answer
74
views
Eigenvalues of a circulant: DFT or Inverse DFT Convention?
Currently, most engineering texts (and webpages including Wikipedia) define forward discrete Fourier transform with a negative sign on the exponential. This is a convention and the inverse discrete ...
1
vote
1
answer
71
views
Extracting eigenvalues of a circulant matrix using discrete Fourier matrix
The eigenvalues of a circulant matrix $C$ can be extracted as $$
\Lambda=F^{-1} C F
$$
where the $F$ matrix is a discrete Fourier transform matrix and $\Lambda$ is a diagonal matrix of eigenvalues.
...
3
votes
1
answer
177
views
The proof of the invertibility of $\Big( \sin\frac{8kl\pi}{2n+1} \Big)_{k,l=1}^\frac{n}{2}$
Suppose that $n$ is even. Any suggestion/appraoch to prove that $S=\Big( \sin\frac{8kl\pi}{2n+1} \Big)_{k,l=1}^\frac{n}{2}$ is invertible?
1
vote
0
answers
84
views
What are the eigenvalues/eigenvectors of the matrix $A=\Big(\frac{1}{\cos(k-l)\frac{\pi}{n}}\Big)_{k,l=1}^{\frac{n-1}{2}}$ when $n$ is odd?
Suppose that $n$ is odd. The eigen values/eigenvectors of the skew-circulant matrix $A=\Big(\frac{1}{\cos(k-l)\frac{\pi}{n}}\Big)_{k,l=1}^n$ are successfully computed in this post.
Q. What are ...
2
votes
1
answer
260
views
The eigenvalues of the matrix $\Big(\frac{1}{\cos(k-l)\frac{\pi}{n}}\Big)_{k,l=1}^n$
What are the eigenvalues/eigenvectors of the matrix $A=\Big(\frac{1}{\cos(k-l)\frac{\pi}{n}}\Big)_{k,l=1}^n$ when $n$ is odd?
1
vote
1
answer
85
views
Can the condition number of a Jordan basis be made stubbornly large?
For each $k \in \mathbb R$, does there exist a non-empty open ball $B$ of $\mathbb R^{2 \times 2}$ such that for all $M \in B$ and Jordan decompositions $PJP^{-1}$ of $M$, the condition number $\kappa(...
3
votes
0
answers
122
views
Can the Jordan decomposition of a matrix be computed in a backwards stable way?
Let $PJP^{-1}$ denote the Jordan decomposition of $M$. The matrix $J$ is a direct sum of Jordan blocks; it is unique up to permutation of the Jordan blocks. The matrix $P$ is not unique.
There are two ...
0
votes
0
answers
13
views
How do I know sparse identification of nonlinear dynamics (SINDy) is correct?
Here is the algorithm/technique in question, https://www.youtube.com/watch?v=NxAn0oglMVw.
How do I know that this algorithm is correct? No where in any of the papers do they talk about a proof? What ...
0
votes
0
answers
85
views
How to analyse the range of eigenvalues of a symmetric and indefinite matrix?
Let $G$ be a symmetric and indefinite matrix defined as follows
$$ G := S - \begin{pmatrix} I_n & I_n \\ I_n & I_n \end{pmatrix},$$
where $S$ is a symmetric positive definite matrix of size $...
1
vote
0
answers
42
views
Solving a block tridiagonal system with diagonal perturbations
Say we have a block tridiagonal matrix, $T \in \mathbb{R}^{NL \times NL}$, with constant off diagonals, $\mathbf{B} \in \mathbb{R}^{L\times L}$, given by
$$
T = \begin{bmatrix} \mathbf{A}_1 & \...
0
votes
1
answer
68
views
$\det(HH’) = 0$ for nonnegative $H$
$H$ is an $n\times m$ matrix with non-negative coefficients and $n < m$. $H'$ is the transpose of $H$.
Are the following statements true?
If $\det(HH’) > 0$, the rows of $H$ define the edges of ...
0
votes
0
answers
17
views
Identifying redundant vectors In non-negative matrix bases
I have a target non-negative matrix $X$ that I would like to factor.
I have two non-negative matrices $W$ and $H$ such that $WH = X$. In this formulation, the rows of $H$ are $L^2$ normalized and ...
1
vote
1
answer
57
views
Given a set of vectors how to pick $M$ such that sum of maximums of coordinates is maximized?
I asked the same on math.Stackexchange.
I have $n$ (say $n = 300$) vectors $v_1,\dots,v_n$. Each of them has $K$ coordinates (say $K = 30$). For vector $v_j$ I denote it's coordinates as $v_{j1},\...
1
vote
0
answers
32
views
Efficient solution to linear matrix equations
A general form for a linear matrix equation can be written as
$$AX + XB + \sum C_iXD_i$$
If $C_i$ and $D_i$ are all 0, then this simplifies into a well known and studied matrix equation that has an ...
3
votes
0
answers
113
views
Preconditioners for $Ax=y$ that rely on hierarchical statistical modeling
Solving $Ax=y$ exactly can be done as:
fit a linear autoregressive model by treating rows of $A$ as data
apply this model to $A^T y$
Imperfect predictive model corresponds to an approximate inverse ...
1
vote
1
answer
44
views
Does norm of discrepancy decrease monotonously in CGLS/CGNR
I am the author of the package for tomographic reconstruction https://github.com/kulvait/KCT_cbct I have implemented CGLS/CGNR , algorithm which applies conjugate gradients on normal equation
$$
A^\...
2
votes
0
answers
25
views
Solve sparse system with nested inverse
What is the most efficient way to solve an equation
\begin{align*}
(A\,E^{-1}\,C) x = b, \qquad A\in \mathbb{R}^{m\times n}, \, E \in \mathbb{R}^{n\times n}, \, C\in \mathbb{R}^{n\times m}
\end{align*}...
7
votes
2
answers
198
views
Finding $\theta$ such that at least one eigenvalue of $A(\theta)$ is real
Is there a known method to find a set of $\theta$ such that at least one eigenvalue of $A(\theta)$ is purely real?
Assume $A(\theta)$ is a real square matrix whose elements are linear functions of a ...
2
votes
2
answers
206
views
Sum over exponentiated bilinear form in finite-field vector space
Let $A$ be a linear map over the finite-field vector space $(\mathbb F_2)^n$, i.e., an $\mathbb F_2$-valued $n\times n$ matrix, not necessarily symmetric. I'm interested in the sum
$$Z(A) = \sum_{X\...
2
votes
0
answers
109
views
Proving some properties of the Landweber–Fridman iterates
$\newcommand\norm[1]{\lVert#1\rVert}$Let $B\in \mathbb R^{n\times n}$ be a symmetric and positive definite matrix. Assume that $x\in \mathbb R^n$ is the solution of $Bx=w$ for some given $w\in \mathbb ...
17
votes
4
answers
5k
views
Why is fast matrix multiplication impractical?
I am wondering why fast matrix multiplications are impractical, especially for Boolean matrix multiplication.
I read some content saying fast matrix multiplications are impractical because of large ...
1
vote
0
answers
154
views
Find the eigenvectors from the QR algorithm in the unsymmetric case
It is possible to find many references describing the QR Algorithm with more or less refinements to approximate the eigenvalues of a square matrix $A\in\mathbb{R}^{n\times n}$.
I implemented a version ...
1
vote
0
answers
110
views
Complexity of singular value decomposition using matrix multiplication oracles
Suppose I have an $n\times m$ real matrix $A$, $n\ll m$ with full row rank $(\mathrm{rank}(A) = n)$. I have an oracle that can compute $Ax$ or $A^T y$ for any $x\in \mathbb{R}^m, y\in \mathbb{R}^n$. ...
0
votes
1
answer
97
views
What is the best way to choose initial basis when applying simplex method to an equality form of LP?
Currently I'm trying to write a practically fast LP solver for a sparse instance, which is by simplex method with LU decomposition and eta-matrix update. In the development I realized that I'm not ...
0
votes
1
answer
107
views
Proving maximum value of a determinant of $I - B$, where $B$ is nonnegative matrix
I have the following setting:
Let $0 \leq r < 1$ and let $\{z_i\}_{i=1}^k$ be $k$ complex numbers such that $|z_i| \leq r$ for all $i$.
Moreover, $r + \sum_{i=1}^k 2Re(z_i) \geq 0$
I am interested ...
3
votes
2
answers
713
views
Iterative methods for linear system with non-diagonally dominant matrix
I have a linear system
\begin{align*}
\left[\begin{array}{cccc}
1 & 2 & 1 & -1 \\
3 & 2 & 4 & 4 \\
4 & 4 & 3 & 4 \\
2 & 0 &...
0
votes
1
answer
140
views
Correct way to conduct equilibrium scaling of linear/integer/MIP program
I would like to scale my linear/integer program and also mixed-integer program using the equilibrium scaling method. I have worked on two research papers and one research book. However, they did the ...
1
vote
1
answer
183
views
Does Wilkinson's shift need to be discontinuous?
Given a symmetric Hessenberg matrix $A = \left[\begin{matrix}\ddots& \vdots & \vdots\\\dotsb & a & b\\\dotsb& b & c\end{matrix}\right]$, the Wilkinson shift $\mu$ employed in ...
3
votes
1
answer
130
views
Smooth, non-analytic functions of non-normal matrices
My apologies if this isn't a well-enough-posed question, I think I'm partly unsure of what exact question to even ask.
There are many different ways in which we can take a function of a matrix.
We ...
2
votes
1
answer
248
views
Is it possible to obtain orthogonal (but not normalized) vectors after QR factorization?
After QR decomposition of a matrix, $M$, the columns of Q are orthonormal. Is it possible after obtaining Q, we recover unnormalized column vectors from $Q$? For example, the matrix M has the ...
2
votes
0
answers
103
views
Convolution integral and its matrix representation
My background is chemistry and I was exploring some one dimensional deconvolution problems i.e., resolution of two or more overlapping peaks. A lot of excellent work was done in the 1970-80s. However, ...
2
votes
1
answer
77
views
Where has the necessary and sufficient condition for the convergence of the unshifted QR algorithm been stated?
I've obtained a necessary and sufficient condition for the unshifted QR algorithm to converge. The condition for the algorithm to converge for a square matrix $M$ is:
For any two eigenvalues $\lambda$...
2
votes
0
answers
153
views
Maximize the product of Hadamard matrix and a vector
Let $X$ be an $n \times n$ Hadamard matrix (i.e. entries are in $\{-1,1\}$ and rows are orthogonal). For my application, we can assume $n=2^k$.
Given a vector $\bf{w} \in R^n$, I want to find the $X^*$...
6
votes
2
answers
978
views
Complexity of rectangular matrix multiplication
I am interested in the complexity of multiplying two matrices $A$ and $B$, i.e. to compute $AB$.
From [Le Gall and Urrotia], I know that:
if $A$ and $B$ are square-matrices of size $n$, then this can ...