14 pages, 2 figures, 2 tables. Extension of the work in arXiv:1610.07038International audienceFloating point error is a drawback of embedded systems implementation that is difficult to avoid. Computing rigorous upper bounds of roundoff errors is absolutely necessary for the validation of critical software. This problem of computing rigorous upper bounds is even more challenging when addressing non-linear programs. In this paper, we propose and compare two new algorithms based on Bernstein expansions and sparse Krivine-Stengle representations, adapted from the field of the global optimization, to compute upper bounds of roundoff errors for programs implementing polynomial and rational functions. We also provide the convergence rate of these ...
Les nombres à virgule flottante sont utilisés dans de nombreuses applications pour effectuer des cal...
This paper proposes a counterexample-guided narrowing ap-proach, which mutually refines analyses and...
The Horner and Goertzel algorithms are frequently used in polynomial evaluation. Each of them can be...
14 pages, 2 figures, 2 tables. Extension of the work in arXiv:1610.07038International audienceFloati...
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...
18 pages, 2 tables, 1 figureInternational audienceA longstanding problem related to floating-point i...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
A roundoff error analysis of formulae for evaluating polynomials is performed. The considered formul...
An emerging area of research is to automatically compute reasonably precise upper bounds on numerica...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
AbstractThe error propagation characteristics of the polynomial evaluation schemes of Horner, Clensh...
AbstractRounding error bounds of the Forsythe and the Clenshaw–Smith algorithm for the evaluation of...
Rigorous estimation of maximum floating-point round-off errors is an important capability central to...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
Les nombres à virgule flottante sont utilisés dans de nombreuses applications pour effectuer des cal...
This paper proposes a counterexample-guided narrowing ap-proach, which mutually refines analyses and...
The Horner and Goertzel algorithms are frequently used in polynomial evaluation. Each of them can be...
14 pages, 2 figures, 2 tables. Extension of the work in arXiv:1610.07038International audienceFloati...
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...
18 pages, 2 tables, 1 figureInternational audienceA longstanding problem related to floating-point i...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
A roundoff error analysis of formulae for evaluating polynomials is performed. The considered formul...
An emerging area of research is to automatically compute reasonably precise upper bounds on numerica...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
AbstractThe error propagation characteristics of the polynomial evaluation schemes of Horner, Clensh...
AbstractRounding error bounds of the Forsythe and the Clenshaw–Smith algorithm for the evaluation of...
Rigorous estimation of maximum floating-point round-off errors is an important capability central to...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
Les nombres à virgule flottante sont utilisés dans de nombreuses applications pour effectuer des cal...
This paper proposes a counterexample-guided narrowing ap-proach, which mutually refines analyses and...
The Horner and Goertzel algorithms are frequently used in polynomial evaluation. Each of them can be...