Abstract. We introduce a concrete semantics for floating-point operations which describes the propagation of roundoff errors throughout a calculation. This semantics is used to assert the correctness of a static analysis which can be straightforwardly derived from it. In our model, every elementary operation introduces a new first order error term, which is later propagated and combined with other error terms, yielding higher order error terms. The semantics is parameterized by the maximal order of error to be examined and verifies whether higher order errors actually are negligible. We consider also coarser semantics computing the contribution, to the final error, of the errors due to some intermediate computations. As a result, we obtain ...
This paper introduces a static analysis technique for computing formally verified round-off error bo...
In this article, we introduce a new static analysis for numerical accuracy. Weaddress the problem of...
AbstractThis paper treats semantics of numerical programs generally, but is principally concerned wi...
Abstract. We introduce a concrete semantics for floating-point operations which describes the propag...
We propose a hardware-computed estimate of the roundoff error in floating-point com-putations. The e...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
An emerging area of research is to automatically compute reasonably precise upper bounds on numerica...
This paper presents an abstract interpretation framework for the round-off error analysis of floatin...
Abstract. Finite precision computations can severely affect the accuracy of computed solutions. We p...
Models of algorithms of floating-point addition are designed for chopping, correctly rounding and au...
This article introduces a new program transformation in order to enhance the numerical accuracy of f...
Finite-precision floating point arithmetic unavoidably introduces rounding errors which are traditio...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
Abstract. A desirable property of control systems is to be robust to in-puts, that is small perturba...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
This paper introduces a static analysis technique for computing formally verified round-off error bo...
In this article, we introduce a new static analysis for numerical accuracy. Weaddress the problem of...
AbstractThis paper treats semantics of numerical programs generally, but is principally concerned wi...
Abstract. We introduce a concrete semantics for floating-point operations which describes the propag...
We propose a hardware-computed estimate of the roundoff error in floating-point com-putations. The e...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
An emerging area of research is to automatically compute reasonably precise upper bounds on numerica...
This paper presents an abstract interpretation framework for the round-off error analysis of floatin...
Abstract. Finite precision computations can severely affect the accuracy of computed solutions. We p...
Models of algorithms of floating-point addition are designed for chopping, correctly rounding and au...
This article introduces a new program transformation in order to enhance the numerical accuracy of f...
Finite-precision floating point arithmetic unavoidably introduces rounding errors which are traditio...
We present a new tool that generates bounds on the values and the round-off errors of programs using...
Abstract. A desirable property of control systems is to be robust to in-puts, that is small perturba...
We present a detailed study of roundoff errors in probabilistic floating-point computations. We deri...
This paper introduces a static analysis technique for computing formally verified round-off error bo...
In this article, we introduce a new static analysis for numerical accuracy. Weaddress the problem of...
AbstractThis paper treats semantics of numerical programs generally, but is principally concerned wi...