Gal's accurate tables algorithm aims at providing an efficient implementation of mathematical functions with correct rounding as often as possible. This method requires an expensive pre-computation of the values taken by the function - or by several related functions - at some distinguished points. Our improvements of Gal's method are two-fold: on the one hand we describe what is the arguably best set of distinguished values and how it improves the efficiency and accuracy of the function implementation, and on the other hand we give an algorithm which drastically decreases the cost of the pre-computation. These improvements are related to the worst cases for the correct rounding of mathematical functions and to the algorithms for finding th...
Abstract. In this Part II of this paper we first refine the analysis of error-free vector transforma...
Abstract—Since 1985, the IEEE 754 standard defines for-mats, rounding modes and basic operations for...
Daisy is a framework for verifying and bounding the magnitudes of rounding errors introduced by floa...
Gal’s accurate tables algorithm aims at providing an ef-ficient implementation of mathematical funct...
International audienceElementary mathematical functions are pervasively used in many applications su...
(eng) This article shows that IEEE-754 double-precision correct rounding of the most common elementa...
International audienceWe explicit the link between the computer arithmetic problem of providing corr...
The Table Maker's Dilemma is the problem of always getting correctly rounded results when computing ...
Abstract. We explicit the link between the computer arithmetic problem of providing correctly rounde...
The Floating-Point (FP) implementation of a real-valued function is performed with correct rounding ...
We give here the results of a four-year search for the worst cases for correct rounding of the major...
This text briefly presents the current state of our work on correctly rounded transcendentals, and e...
We present an algorithm for implementing correctly rounded exponentials in double-precision floating...
Since 1985, the IEEE 754 standard defines formats, rounding modes and basic operations for floating-...
(eng) We give here the results of a four-year search for the worst cases for correct rounding of the...
Abstract. In this Part II of this paper we first refine the analysis of error-free vector transforma...
Abstract—Since 1985, the IEEE 754 standard defines for-mats, rounding modes and basic operations for...
Daisy is a framework for verifying and bounding the magnitudes of rounding errors introduced by floa...
Gal’s accurate tables algorithm aims at providing an ef-ficient implementation of mathematical funct...
International audienceElementary mathematical functions are pervasively used in many applications su...
(eng) This article shows that IEEE-754 double-precision correct rounding of the most common elementa...
International audienceWe explicit the link between the computer arithmetic problem of providing corr...
The Table Maker's Dilemma is the problem of always getting correctly rounded results when computing ...
Abstract. We explicit the link between the computer arithmetic problem of providing correctly rounde...
The Floating-Point (FP) implementation of a real-valued function is performed with correct rounding ...
We give here the results of a four-year search for the worst cases for correct rounding of the major...
This text briefly presents the current state of our work on correctly rounded transcendentals, and e...
We present an algorithm for implementing correctly rounded exponentials in double-precision floating...
Since 1985, the IEEE 754 standard defines formats, rounding modes and basic operations for floating-...
(eng) We give here the results of a four-year search for the worst cases for correct rounding of the...
Abstract. In this Part II of this paper we first refine the analysis of error-free vector transforma...
Abstract—Since 1985, the IEEE 754 standard defines for-mats, rounding modes and basic operations for...
Daisy is a framework for verifying and bounding the magnitudes of rounding errors introduced by floa...