18 pages, 2 tables, 1 figureInternational audienceA longstanding problem related to floating-point implementation of numerical programs is to provide efficient yet precise analysis of output errors. We present a framework to compute lower bounds on largest absolute roundoff errors, for a particular rounding model. This method applies to numerical programs implementing polynomial functions with box constrained input variables. Our study is based on three different hierarchies, relying respectively on generalized eigenvalue problems, elementary computations and semidefinite programming (SDP) relaxations. This is complementary of over-approximation frameworks, consisting of obtaining upper bounds on the largest absolute roundoff error. Combini...
The largest dense linear systems that are being solved today are of order $n = 10^7$. Single precis...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
Aggregated roundoff errors caused by floating-point arithmetic can make numerical code highly unreli...
18 pages, 2 tables, 1 figureInternational audienceA longstanding problem related to floating-point i...
A longstanding problem related to floating-point implementation of numerical programs is to provide ...
Roundoff errors cannot be avoided when implementing numerical programs with finite precision. The ab...
Floating point error is an inevitable drawback of embedded systems implementation. Computing rigorou...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
Abstract. A wide variety of problems in global optimization, combinatorial optimization as well as s...
An emerging area of research is to automatically compute reasonably precise upper bounds on numerica...
Les nombres à virgule flottante sont utilisés dans de nombreuses applications pour effectuer des cal...
Abstract. Many current deterministic solvers for NP-hard combinato-rial optimization problems are ba...
Many current deterministic solvers for NP-hard combinatorial optimization problems are based on nonl...
Abstract. Rounding error analyses of numerical algorithms are most often carried out via repeated ap...
International audienceWhen a floating-point computation is done, it is most of the time incorrect. T...
The largest dense linear systems that are being solved today are of order $n = 10^7$. Single precis...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
Aggregated roundoff errors caused by floating-point arithmetic can make numerical code highly unreli...
18 pages, 2 tables, 1 figureInternational audienceA longstanding problem related to floating-point i...
A longstanding problem related to floating-point implementation of numerical programs is to provide ...
Roundoff errors cannot be avoided when implementing numerical programs with finite precision. The ab...
Floating point error is an inevitable drawback of embedded systems implementation. Computing rigorou...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
Abstract. A wide variety of problems in global optimization, combinatorial optimization as well as s...
An emerging area of research is to automatically compute reasonably precise upper bounds on numerica...
Les nombres à virgule flottante sont utilisés dans de nombreuses applications pour effectuer des cal...
Abstract. Many current deterministic solvers for NP-hard combinato-rial optimization problems are ba...
Many current deterministic solvers for NP-hard combinatorial optimization problems are based on nonl...
Abstract. Rounding error analyses of numerical algorithms are most often carried out via repeated ap...
International audienceWhen a floating-point computation is done, it is most of the time incorrect. T...
The largest dense linear systems that are being solved today are of order $n = 10^7$. Single precis...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
Aggregated roundoff errors caused by floating-point arithmetic can make numerical code highly unreli...