AbstractValidated solution of a problem means to compute error bounds for a solution in finite precision. This includes the proof of existence of a solution. The computed error bounds are to be correct including all possible effects of rounding errors. The fastest known validation algorithm for the solution of a system of linear equations requires twice the computing time of a standard (purely) numerical algorithm. In this paper we present a super-fast validation algorithm for linear systems with symmetric positive definite matrix. This means that the entire computing time for the validation algorithm including computation of an approximated solution is the same as for a standard numerical algorithm. Numerical results are presented
AbstractWe describe an algorithm that first decides whether the primal-dual pair of linear programsm...
International audienceWe provide a new framework for a posteriori validation of vector-valued proble...
On many current and emerging computing architectures, single-precision calculations are at least twi...
Abstract. Validated solution of a problem means to compute error bounds for a solution in finite pre...
A parallel version of the self-verified method for solving linear systems was presented on PARA and ...
Abstract Some new methods will be presented for computing verified inclusions of the solution of lar...
The Reliable Computing journal has no more paper publication, only free, electronic publication.Inte...
summary:This paper concerns accuracy-guaranteed numerical computations for linear systems. Due to th...
International audienceThe problem considered here is to refine an approximate, numerical, solution o...
International audienceSolving numerically a linear system can be performed very efficiently, using o...
Abstract. In this paper we describe some of the principles of methods for the verified solution of l...
What is the fastest way to solve a linear system $Ax= b$ in arithmetic of a given precision when $A$...
This paper is concerned with the problem of verifying the accuracy of an approximate solution of a s...
2009-2010 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe
AbstractWe develop methods for computing verified solutions of Sylvester matrix equations AX+XB=C. T...
AbstractWe describe an algorithm that first decides whether the primal-dual pair of linear programsm...
International audienceWe provide a new framework for a posteriori validation of vector-valued proble...
On many current and emerging computing architectures, single-precision calculations are at least twi...
Abstract. Validated solution of a problem means to compute error bounds for a solution in finite pre...
A parallel version of the self-verified method for solving linear systems was presented on PARA and ...
Abstract Some new methods will be presented for computing verified inclusions of the solution of lar...
The Reliable Computing journal has no more paper publication, only free, electronic publication.Inte...
summary:This paper concerns accuracy-guaranteed numerical computations for linear systems. Due to th...
International audienceThe problem considered here is to refine an approximate, numerical, solution o...
International audienceSolving numerically a linear system can be performed very efficiently, using o...
Abstract. In this paper we describe some of the principles of methods for the verified solution of l...
What is the fastest way to solve a linear system $Ax= b$ in arithmetic of a given precision when $A$...
This paper is concerned with the problem of verifying the accuracy of an approximate solution of a s...
2009-2010 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe
AbstractWe develop methods for computing verified solutions of Sylvester matrix equations AX+XB=C. T...
AbstractWe describe an algorithm that first decides whether the primal-dual pair of linear programsm...
International audienceWe provide a new framework for a posteriori validation of vector-valued proble...
On many current and emerging computing architectures, single-precision calculations are at least twi...