Reasoning about floating-point numbers is notoriously difficult, owing to the lack of convenient algebraic properties such as associativity. This poses a substantial challenge for program analysis and verification tools which rely on precise floating-point constraint solving. Currently, interval methods in this domain often exhibit slow convergence even on simple examples. We present a new theorem supporting efficient computation of exact bounds of the intersection of a rectangle with the preimage of an interval under floating-point addition, in any radix or rounding mode. We thus give an efficient method of deducing optimal bounds on the components of an addition, solving the convergence problem
We introduce an algorithm for multiplying a floating-point number x by a constant C that is not exac...
We introduce an algorithm for multiplying a floating-point number $x$ by a constant $C$ that is not ...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
International audienceIn a setting where we have intervals for the values of floating-point variable...
Floating-point computations are quickly finding their way in the design of safety- and mission-crit...
Rigorous a priori error bounds for floating-point computations are derived. We will show that using ...
This thesis develops tight upper and lower bounds on the relative error in various schemes for perf...
International audienceThe accuracy analysis of complex floating-point multiplication done by Brent, ...
Abstract. The accuracy analysis of complex floating-point multiplication done by Brent, Percival, an...
We discuss floating-point filters as a means of restricting the precision needed for arithmetic oper...
10 pagesInternational audienceThis paper presents a study of some basic blocks needed in the design ...
Floating-point computations are quickly finding their way in the design of safety- and mission-criti...
Abstract. Rounding error analyses of numerical algorithms are most often carried out via repeated ap...
Aggregated roundoff errors caused by floating-point arithmetic can make numerical code highly unreli...
Abstract. Given a vector of floating-point numbers with exact sum s, we present an algorithm for cal...
We introduce an algorithm for multiplying a floating-point number x by a constant C that is not exac...
We introduce an algorithm for multiplying a floating-point number $x$ by a constant $C$ that is not ...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
International audienceIn a setting where we have intervals for the values of floating-point variable...
Floating-point computations are quickly finding their way in the design of safety- and mission-crit...
Rigorous a priori error bounds for floating-point computations are derived. We will show that using ...
This thesis develops tight upper and lower bounds on the relative error in various schemes for perf...
International audienceThe accuracy analysis of complex floating-point multiplication done by Brent, ...
Abstract. The accuracy analysis of complex floating-point multiplication done by Brent, Percival, an...
We discuss floating-point filters as a means of restricting the precision needed for arithmetic oper...
10 pagesInternational audienceThis paper presents a study of some basic blocks needed in the design ...
Floating-point computations are quickly finding their way in the design of safety- and mission-criti...
Abstract. Rounding error analyses of numerical algorithms are most often carried out via repeated ap...
Aggregated roundoff errors caused by floating-point arithmetic can make numerical code highly unreli...
Abstract. Given a vector of floating-point numbers with exact sum s, we present an algorithm for cal...
We introduce an algorithm for multiplying a floating-point number x by a constant C that is not exac...
We introduce an algorithm for multiplying a floating-point number $x$ by a constant $C$ that is not ...
We present a new tool that generates bounds on the values and the round-off errors of programs using...