Add to ORKGBlock projections have been used, in [Eberly et al. 2006], to obtain an efficient algorithm to find solutions for sparse systems of linear equations. A bound of softO(n^(2.5)) machine operations is obtained assuming that the input matrix can be multiplied by a vector with constant-sized entries in softO(n) machine operations. Unfortunately, the correctness of this algorithm depends on the existence of efficient block projections, and this has been conjectured. In this paper we establish the correctness of the algorithm from [Eberly et al. 2006] by proving the existence of efficient block projections over sufficiently large fields. We demonstrate the usefulness of these projections by deriving improved bounds for the cost of several matrix p...
International audienceThe computational cost of many signal processing and machine learning techniqu...
Abstract. On many high-speed computers the dense matrix technique is preferable to sparse matrix tec...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
Block projections have been used, in [Eberly et al. 2006], to obtain an efficient algorithm to find ...
We improve the current best running time value to invert sparse matrices over finite fields, lowerin...
We improve the current best running time value to invert sparse matrices over finite fields, lowerin...
International audienceIn this paper we describe how the half-gcd algorithm can be adapted in order t...
We propose a new algorithm to solve sparse linear systems of equations over the integers. This algor...
International audienceIn this paper we describe how the half-gcd algorithm can be adapted in order t...
Black box linear algebra algorithms treat matrices as black boxes that can be applied to input vecto...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceFor matrices with displacement structure, basic operations like multiplication...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
AbstractWe present an inversion algorithm for nonsingular n×n matrices whose entries are degree d po...
International audienceThe computational cost of many signal processing and machine learning techniqu...
International audienceThe computational cost of many signal processing and machine learning techniqu...
Abstract. On many high-speed computers the dense matrix technique is preferable to sparse matrix tec...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
Block projections have been used, in [Eberly et al. 2006], to obtain an efficient algorithm to find ...
We improve the current best running time value to invert sparse matrices over finite fields, lowerin...
We improve the current best running time value to invert sparse matrices over finite fields, lowerin...
International audienceIn this paper we describe how the half-gcd algorithm can be adapted in order t...
We propose a new algorithm to solve sparse linear systems of equations over the integers. This algor...
International audienceIn this paper we describe how the half-gcd algorithm can be adapted in order t...
Black box linear algebra algorithms treat matrices as black boxes that can be applied to input vecto...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceFor matrices with displacement structure, basic operations like multiplication...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
AbstractWe present an inversion algorithm for nonsingular n×n matrices whose entries are degree d po...
International audienceThe computational cost of many signal processing and machine learning techniqu...
International audienceThe computational cost of many signal processing and machine learning techniqu...
Abstract. On many high-speed computers the dense matrix technique is preferable to sparse matrix tec...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...