We describe a simple random-sampling based procedure for producing sparse matrix approximations. Our procedure and analysis are extremely simple: the analysis uses nothing more than the Chernoff-Hoeffding bounds. Despite the simplicity, the approximation is comparable and sometimes better than previous work. Our algorithm computes the sparse matrix approximation in a single pass over the data. Further, most of the entries in the output matrix are quantized, and can be succinctly represented by a bit vector, thus leading to much savings in space
Matrices of huge size and low rank are encountered in applications from the real world where large s...
AbstractA randomized strategy or a convex combination may be represented by a probability vector p =...
AbstractWe introduce a randomized procedure that, given an m×n matrix A and a positive integer k, ap...
spam is an R package for sparse matrix algebra with emphasis on a Cholesky factor-ization of sparse ...
Randomized matrix sparsification has proven to be a fruitful technique for producing faster algorit...
In this work, we propose a new randomized algorithm for computing a low-rank approximation to a give...
Abstract The aim of this paper is to develop strategies to estimate the sparsity degree of a signal ...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
Abstract. Sparse matrix-vector multiplication is an important computational kernel that tends to per...
We propose an algorithm for recovering the matrix A in X = AS where X is a random vector of lower d...
International audienceAn increasing number of applications is concerned with recovering a sparse mat...
Standard tools to update approximations to a matrix A (for example, Quasi-Newton Hessian approximati...
Randomized sampling techniques have recently proved capable of efficiently solving many standard pro...
In this paper, we survey algorithms for sparse recovery problems that are based on sparse random mat...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
AbstractA randomized strategy or a convex combination may be represented by a probability vector p =...
AbstractWe introduce a randomized procedure that, given an m×n matrix A and a positive integer k, ap...
spam is an R package for sparse matrix algebra with emphasis on a Cholesky factor-ization of sparse ...
Randomized matrix sparsification has proven to be a fruitful technique for producing faster algorit...
In this work, we propose a new randomized algorithm for computing a low-rank approximation to a give...
Abstract The aim of this paper is to develop strategies to estimate the sparsity degree of a signal ...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
Abstract. Sparse matrix-vector multiplication is an important computational kernel that tends to per...
We propose an algorithm for recovering the matrix A in X = AS where X is a random vector of lower d...
International audienceAn increasing number of applications is concerned with recovering a sparse mat...
Standard tools to update approximations to a matrix A (for example, Quasi-Newton Hessian approximati...
Randomized sampling techniques have recently proved capable of efficiently solving many standard pro...
In this paper, we survey algorithms for sparse recovery problems that are based on sparse random mat...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
AbstractA randomized strategy or a convex combination may be represented by a probability vector p =...
AbstractWe introduce a randomized procedure that, given an m×n matrix A and a positive integer k, ap...