Search Results

Suppose I have a real unitary matrix $U$ and a unit vector $\mathbf{x}, \|\mathbf{x}\|_2 = 1$. What is the solution to the following problem? $$ \widehat{\mathbf{x}} = \arg\max_{\mathbf{x}, ~\|\mathb …

T. Tao in his notes on eigenvalue inequalities uses Courant-Fischer min-max theorem to prove the eigenvalue stability inequality. Specifically, I am looking for proof of Eq. (13) where he states as a …

Suppose I have a symmetric tridiagonal (Jacobi) matrix in the following form: $ \begin{pmatrix} 1 & a_{1} & 0 & ... & 0 \\\ a_{1} & 1 & a_{2} & & ... \\\ 0 & a_{2} & 1 & ... & 0 \\\ ... & & ... & …

How can I compute the partial derivatives of the dominant eigenvalue and eigenvectors of a real symmetric matrix $\mathbf{A}$? In particular, given $ \mathbf{v}^* = \arg\max_{\mathbf{v}} \mathbf{v}^ …

I have a matrix $X \in \mathbb{R}^{m\times n}$ and I want to estimate it with a dense matrix $Y^{m\times n}$ such that $Y$ is still close to $X$ in some distance measure. Is this doable in a computati …