The aim of this thesis is to provide techniques for the abstraction of floating-point expressions into the polyhedra domain as well as into the finite powerset of polyhedra domain. Moreover, this thesis aims at presenting a forward and a backward analysis for the detection and inference of floating-point errors such as overflow and division by zero. These techniques are based on abstract interpretation, which is a theory for the sound approximation of the semantics of programs. These abstractions and analyses have important applications for instance in engineering, mechanics and computer aided graphics design. The abstraction of floating-point expressions into polyhedra includes two stages. the first, we present an approximation of floating...
Abstract. Finite precision computations can severely affect the accuracy of computed solutions. We p...
In high performance computing, nearly all the implementations and published experiments use floatin...
The focus of our work is the verification of tight functional properties of numerical programs, such...
The aim of this thesis is to provide techniques for the abstraction of floating-point expressions in...
Abstract We present a new idea to adapt relational abstract domains to the analysis of IEEE 754-comp...
In this article, we introduce a new static analysis for numerical accuracy. Weaddress the problem of...
In this thesis we present an approach to automated verification of floating point programs. Existing...
This paper introduces a static analysis technique for computing formally verified round-off error bo...
This paper presents an abstract interpretation framework for the round-off error analysis of floatin...
International audiencePrograms with floating-point computations are often derived from mathematical ...
This paper proposes a technique for automaticdetection of overflow and roundoff errors, causedby the...
http://link.springer.com/article/10.1007/s10515-014-0154-2International audienceStatic value analysi...
International audiencePrograms with floating-point computations are often derived from mathematical ...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
This paper presents an implementation of an extension of the ACSL specication language in the Frama-...
Abstract. Finite precision computations can severely affect the accuracy of computed solutions. We p...
In high performance computing, nearly all the implementations and published experiments use floatin...
The focus of our work is the verification of tight functional properties of numerical programs, such...
The aim of this thesis is to provide techniques for the abstraction of floating-point expressions in...
Abstract We present a new idea to adapt relational abstract domains to the analysis of IEEE 754-comp...
In this article, we introduce a new static analysis for numerical accuracy. Weaddress the problem of...
In this thesis we present an approach to automated verification of floating point programs. Existing...
This paper introduces a static analysis technique for computing formally verified round-off error bo...
This paper presents an abstract interpretation framework for the round-off error analysis of floatin...
International audiencePrograms with floating-point computations are often derived from mathematical ...
This paper proposes a technique for automaticdetection of overflow and roundoff errors, causedby the...
http://link.springer.com/article/10.1007/s10515-014-0154-2International audienceStatic value analysi...
International audiencePrograms with floating-point computations are often derived from mathematical ...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
This paper presents an implementation of an extension of the ACSL specication language in the Frama-...
Abstract. Finite precision computations can severely affect the accuracy of computed solutions. We p...
In high performance computing, nearly all the implementations and published experiments use floatin...
The focus of our work is the verification of tight functional properties of numerical programs, such...