AbstractThe reciprocal square root calculation α=1/x is very common in scientific computations. Having a correctly rounded implementation of it is of great importance in producing numerically predictable code among today's heterogenous computing environment. Existing results suggest that to get the correctly rounded α in a floating point number system with p significant bits, we may have to compute up to 3p+1 leading bits of α. However, numerical evidence indicates the actual number may be as small as 2p plus a few more bits. This paper attempts to bridge the gap by showing that this is indeed true, assuming the abc conjecture which is widely purported to hold. (But our results do not tell exactly how many more bits beyond the 2p bits, due ...
This paper presents upper bounds on the number of zeros and ones after the rounding bit for algebrai...
This text briefly presents the current state of our work on correctly rounded transcendentals, and e...
International audienceExact rounding is provided for elementary floating-point arithmetic operations...
AbstractThe reciprocal square root calculation α=1/x is very common in scientific computations. Havi...
International audienceWe analyze two fast and accurate algorithms recently presented by Borges for c...
International audienceWe explicit the link between the computer arithmetic problem of providing corr...
Quotients, reciprocals, square roots and square root reciprocals all have the property that infinite...
23 pagesWe introduce several algorithms for accurately evaluating powers to a positive integer in fl...
International audienceWe introduce an algorithm for multiplying a floating-point number $x$ by a con...
International audienceThe 2008 revision of the IEEE-754 standard, which governs floating-point arith...
International audienceWe study the accuracy of a classical approach to computing complex square-root...
International audienceDuring any composite computation there is a constant need for rounding interme...
AbstractFloating-point experts know that mathematical formulas may fail or give imprecise results wh...
This is an extended version of our ARITH-19 article.This paper presents a study of some basic blocks...
Laboratoire LIP : CNRS/ENS Lyon/INRIA/Université Lyon 1We introduce two algorithms for accurately ev...
This paper presents upper bounds on the number of zeros and ones after the rounding bit for algebrai...
This text briefly presents the current state of our work on correctly rounded transcendentals, and e...
International audienceExact rounding is provided for elementary floating-point arithmetic operations...
AbstractThe reciprocal square root calculation α=1/x is very common in scientific computations. Havi...
International audienceWe analyze two fast and accurate algorithms recently presented by Borges for c...
International audienceWe explicit the link between the computer arithmetic problem of providing corr...
Quotients, reciprocals, square roots and square root reciprocals all have the property that infinite...
23 pagesWe introduce several algorithms for accurately evaluating powers to a positive integer in fl...
International audienceWe introduce an algorithm for multiplying a floating-point number $x$ by a con...
International audienceThe 2008 revision of the IEEE-754 standard, which governs floating-point arith...
International audienceWe study the accuracy of a classical approach to computing complex square-root...
International audienceDuring any composite computation there is a constant need for rounding interme...
AbstractFloating-point experts know that mathematical formulas may fail or give imprecise results wh...
This is an extended version of our ARITH-19 article.This paper presents a study of some basic blocks...
Laboratoire LIP : CNRS/ENS Lyon/INRIA/Université Lyon 1We introduce two algorithms for accurately ev...
This paper presents upper bounds on the number of zeros and ones after the rounding bit for algebrai...
This text briefly presents the current state of our work on correctly rounded transcendentals, and e...
International audienceExact rounding is provided for elementary floating-point arithmetic operations...