In a paper, Feron presents how Lyapunov-theoretic proofs of stability can be migrated toward computer-readable and verifiable certificates of control software behavior by relying of Floyd's and Hoare's proof system. However, Lyapunov-theoretic proofs are addressed towards exact, real arithmetic and do not accurately represent the behavior of realistic programs run with machine arithmetic. We address the issue of preserving those proofs in presence of rounding errors resulting from the use of floating-point arithmetic: we present an automatic tool, based on a theoretical framework the soundness of which is proved in Coq, that translates Feron's proof invariants on real arithmetic to similar invariants on floating-point numbers, and preserves...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
International audienceThe most well-known feature of floating-point arithmetic is the limited precis...
We consider the problem of verifying finite precision implementation of linear time-invariant contro...
In Feron presents how Lyapunov-theoretic proofs of stability can be migrated toward computerreadable...
In Feron presents how Lyapunov-theoretic proofs of stability can be migrated toward computer-readabl...
In a paper, Feron presents how Lyapunov-theoretic proofs of stability can be migrated toward compute...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
We provide sufficient conditions that formally guarantee that the floating-point computation of a po...
A critical software is a software whose malfunction may result in death or serious injury to people,...
Un logiciel critique est un logiciel dont le mauvais fonctionnement peut avoir un impact important s...
In this thesis we present an approach to automated verification of floating point programs. Existing...
International audienceHigh confidence in floating-point programs requires proving numerical properti...
International audienceFloating-point arithmetic is a very efficient solution to perform computa-tion...
When computing with floating-point numbers, programmers choose a certain floating-point precision (l...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
International audienceThe most well-known feature of floating-point arithmetic is the limited precis...
We consider the problem of verifying finite precision implementation of linear time-invariant contro...
In Feron presents how Lyapunov-theoretic proofs of stability can be migrated toward computerreadable...
In Feron presents how Lyapunov-theoretic proofs of stability can be migrated toward computer-readabl...
In a paper, Feron presents how Lyapunov-theoretic proofs of stability can be migrated toward compute...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
We provide sufficient conditions that formally guarantee that the floating-point computation of a po...
A critical software is a software whose malfunction may result in death or serious injury to people,...
Un logiciel critique est un logiciel dont le mauvais fonctionnement peut avoir un impact important s...
In this thesis we present an approach to automated verification of floating point programs. Existing...
International audienceHigh confidence in floating-point programs requires proving numerical properti...
International audienceFloating-point arithmetic is a very efficient solution to perform computa-tion...
When computing with floating-point numbers, programmers choose a certain floating-point precision (l...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
The paper proposes a control-theoretic framework for verification of numerical software systems, and...
International audienceThe most well-known feature of floating-point arithmetic is the limited precis...
We consider the problem of verifying finite precision implementation of linear time-invariant contro...