Matrix decompositions are fundamental tools in the area of applied mathematics, statistical computing, and machine learning. In particular, low-rank matrix decompositions are vital, and widely used for data analysis, dimensionality reduction, and data compression. Massive datasets, however, pose a computational challenge for traditional algorithms, placing significant constraints on both memory and processing power. Recently, the powerful concept of randomness has been introduced as a strategy to ease the computational load. The essential idea of probabilistic algorithms is to employ some amount of randomness in order to derive a smaller matrix from a high-dimensional data matrix. The smaller matrix is then used to compute the desired low-r...
Abstract. A classical problem in matrix computations is the efficient and reliable approximation of ...
Research support by: Goal: Given an m × n matrix A, we seek to compute a rank-k approximation, with ...
Randomized algorithms for low-rank matrix approximation are investigated, with the emphasis on the f...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-rev...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-reve...
Randomized sampling techniques have recently proved capable of efficiently solving many standard pro...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
The singular value decomposition (SVD) has a crucial role in model order reduction. It is often util...
AbstractGiven an m×n matrix A and a positive integer k, we describe a randomized procedure for the a...
AbstractWe introduce a randomized procedure that, given an m×n matrix A and a positive integer k, ap...
The development of randomized algorithms for numerical linear algebra, e.g. for computing approximat...
In this paper, a randomized algorithm for high dimensional low rank plus sparse matrix decomposition...
The pivoted QLP decomposition is computed through two consecutive pivoted QR decompositions, and pro...
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
Abstract. A classical problem in matrix computations is the efficient and reliable approximation of ...
Research support by: Goal: Given an m × n matrix A, we seek to compute a rank-k approximation, with ...
Randomized algorithms for low-rank matrix approximation are investigated, with the emphasis on the f...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-rev...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-reve...
Randomized sampling techniques have recently proved capable of efficiently solving many standard pro...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
The singular value decomposition (SVD) has a crucial role in model order reduction. It is often util...
AbstractGiven an m×n matrix A and a positive integer k, we describe a randomized procedure for the a...
AbstractWe introduce a randomized procedure that, given an m×n matrix A and a positive integer k, ap...
The development of randomized algorithms for numerical linear algebra, e.g. for computing approximat...
In this paper, a randomized algorithm for high dimensional low rank plus sparse matrix decomposition...
The pivoted QLP decomposition is computed through two consecutive pivoted QR decompositions, and pro...
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
Abstract. A classical problem in matrix computations is the efficient and reliable approximation of ...
Research support by: Goal: Given an m × n matrix A, we seek to compute a rank-k approximation, with ...
Randomized algorithms for low-rank matrix approximation are investigated, with the emphasis on the f...