Understanding the singular value spectrum of an n x n matrix A is a fundamental task in countless numerical computation and data analysis applications. In matrix multiplication time, it is possible to perform a full SVD of A and directly compute the singular values sigma_1,...,sigma_n. However, little is known about algorithms that break this runtime barrier. Using tools from stochastic trace estimation, polynomial approximation, and fast linear system solvers, we show how to efficiently isolate different ranges of A\u27s spectrum and approximate the number of singular values in these ranges. We thus effectively compute an approximate histogram of the spectrum, which can stand in for the true singular values in many applications. We use o...
We investigate numerically efficient approximations of eigenspaces associated to symmetric and gener...
Recently, Pagh presented a randomized approximation algorithm for the multiplication of real-valued ...
... matrix A. It is often of interest to find a low-rank approximation to A, i.e., an approximation ...
Approximating the singular values or eigenvalues of a matrix, i.e. spectrum approximation, is a fund...
AbstractWe introduce a randomized procedure that, given an m×n matrix A and a positive integer k, ap...
Abstract. In many applications, the data consist of (or may be naturally formulated as) an m × n mat...
Abstract. The H ∞ norm of a transfer matrix function for a control system is the reciprocal of the l...
AbstractThis paper develops an identity for additive modifications of a singular value decomposition...
AbstractGiven an m×n matrix A and a positive integer k, we describe a randomized procedure for the a...
AbstractWe analyze when it is possible to compute the singular values and singular vectors of a matr...
Spectral graph sparsification aims to find an ultra-sparse subgraph whose Laplacian matrix can well ...
AbstractThe operation of multiplication of a vector by a matrix can be represented by a computationa...
We analyze when it is possible to compute the singular values and singular vectors of a matrix with ...
We present three spectral sparsification algorithms that, on input a graph G with n vertices and m e...
Singular spectrum analysis (SSA) is a method of time-series analysis based on the singular value dec...
We investigate numerically efficient approximations of eigenspaces associated to symmetric and gener...
Recently, Pagh presented a randomized approximation algorithm for the multiplication of real-valued ...
... matrix A. It is often of interest to find a low-rank approximation to A, i.e., an approximation ...
Approximating the singular values or eigenvalues of a matrix, i.e. spectrum approximation, is a fund...
AbstractWe introduce a randomized procedure that, given an m×n matrix A and a positive integer k, ap...
Abstract. In many applications, the data consist of (or may be naturally formulated as) an m × n mat...
Abstract. The H ∞ norm of a transfer matrix function for a control system is the reciprocal of the l...
AbstractThis paper develops an identity for additive modifications of a singular value decomposition...
AbstractGiven an m×n matrix A and a positive integer k, we describe a randomized procedure for the a...
AbstractWe analyze when it is possible to compute the singular values and singular vectors of a matr...
Spectral graph sparsification aims to find an ultra-sparse subgraph whose Laplacian matrix can well ...
AbstractThe operation of multiplication of a vector by a matrix can be represented by a computationa...
We analyze when it is possible to compute the singular values and singular vectors of a matrix with ...
We present three spectral sparsification algorithms that, on input a graph G with n vertices and m e...
Singular spectrum analysis (SSA) is a method of time-series analysis based on the singular value dec...
We investigate numerically efficient approximations of eigenspaces associated to symmetric and gener...
Recently, Pagh presented a randomized approximation algorithm for the multiplication of real-valued ...
... matrix A. It is often of interest to find a low-rank approximation to A, i.e., an approximation ...