Add to ORKGInternational audienceWe want to achieve efficient exact computations, such as the rank, of sparse matrices over finite fields. We therefore compare the practical behaviors, on a wide range of sparse matrices of the deterministic Gaussian elimination technique, using reordering heuristics, with the probabilistic, blackbox, Wiedemann algorithm. Indeed, we prove here that the latter is the fastest iterative variant of the Krylov methods to compute the minimal polynomial or the rank of a sparse matrix
Black box linear algebra algorithms treat matrices as black boxes that can be applied to input vecto...
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 audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
In this article, we propose a method to perform linear algebra on a matrix with nearly sparse proper...
International audienceIn this paper we describe how the half-gcd algorithm can be adapted in order t...
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...
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 audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceWe want to achieve efficient exact computations, such as the rank, of sparse m...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
International audienceThis paper considers elimination algorithms for sparse matrices over finite fi...
In this article, we propose a method to perform linear algebra on a matrix with nearly sparse proper...
International audienceIn this paper we describe how the half-gcd algorithm can be adapted in order t...
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...
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...