Romuald Rocher scite author profile

Romuald Rocher

2Publications

82Citation Statements Received

49Citation Statements Given

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Affiliations

Institut de Recherche en Informatique et Systèmes Aléatoires, University of Rennes, French Institute for Research in Computer Science and Automation

Publications

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Analytical Approach for Numerical Accuracy Estimation of Fixed-Point Systems Based on Smooth Operations

Rocher

Ménard²,

Scalart³

et al. 2012

IEEE Trans. Circuits Syst. I

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Abstract-In embedded systems using fixed-point arithmetic, converting applications into fixed-point representations requires a fast and efficient accuracy evaluation. This paper presents a new analytical approach to determine an estimation of the numerical accuracy of a fixed-point system, which is accurate and valid for all systems formulated with smooth operations (e.g. additions, subtractions, multiplications and divisions). The mathematical expression of the system output noise power is determined using matrices to obtain more compact expressions. The proposed approach is based on the determination of the timevarying impulse-response of the system. To speedup computation of the expressions, the impulse response is modelled using a linear prediction approach. The approach is illustrated in the general case of time-varying recursive systems by the Least Mean Square (LMS) algorithm example. Experiments on various and representative applications show the fixedpoint accuracy estimation quality of the proposed approach. Moreover, the approach using the linear-prediction approximation is very fast even for recursive systems. A significant speed-up compared to the best known accuracy evaluation approaches is measured even for the most complex benchmarks.

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Analytical Fixed-Point Accuracy Evaluation in Linear Time-Invariant Systems

Ménard

Rocher

Sentieys

2008

IEEE Trans. Circuits Syst. I

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Romuald Rocher

Analytical Approach for Numerical Accuracy Estimation of Fixed-Point Systems Based on Smooth Operations

Analytical Fixed-Point Accuracy Evaluation in Linear Time-Invariant Systems

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