International audienceWe present a fast algorithm together with its low-level implementation of correctly rounded arbitrary-precision floating-point summation. The arithmetic is the one used by the GNU MPFR library: radix 2; no subnormals; each variable (each input and the output) has its own precision. We also give a worst-case complexity of this algorithm and describe how the implementation is tested
The summation of n floating-point numbers is ubiquitous in numerical computations. We present a new ...
International audienceWe introduce an algorithm for multiplying a floating-point number $x$ by a con...
Abstract. Given a vector of floating-point numbers with exact sum s, we present an algorithm for cal...
International audienceWe present a fast algorithm together with its low-level implementation of corr...
10 pagesInternational audienceThis paper presents a study of some basic blocks needed in the design ...
International audienceThis paper presents a study of some basic blocks needed in the design of float...
Conference URL: http://cca-net.de/rnc6/We study the multiple-precision addition of two positive floa...
This paper presents a multiple-precision binary floating-point library, written in the ISO C languag...
International audienceSome modern processors include decimal floating-point units, with a conforming...
International audienceFloating-point (FP) addition is non-associative and parallel reduction involvi...
AbstractSummation is a basic operation in scientific computing; furthermore division-free arithmetic...
International audienceRounding to odd is a non-standard rounding on floating-point numbers. By using...
International audienceThe 2008 revision of the IEEE-754 standard, which governs floating-point arith...
International audienceThe most well-known feature of floating-point arithmetic is the limited precis...
23 pagesWe introduce several algorithms for accurately evaluating powers to a positive integer in fl...
The summation of n floating-point numbers is ubiquitous in numerical computations. We present a new ...
International audienceWe introduce an algorithm for multiplying a floating-point number $x$ by a con...
Abstract. Given a vector of floating-point numbers with exact sum s, we present an algorithm for cal...
International audienceWe present a fast algorithm together with its low-level implementation of corr...
10 pagesInternational audienceThis paper presents a study of some basic blocks needed in the design ...
International audienceThis paper presents a study of some basic blocks needed in the design of float...
Conference URL: http://cca-net.de/rnc6/We study the multiple-precision addition of two positive floa...
This paper presents a multiple-precision binary floating-point library, written in the ISO C languag...
International audienceSome modern processors include decimal floating-point units, with a conforming...
International audienceFloating-point (FP) addition is non-associative and parallel reduction involvi...
AbstractSummation is a basic operation in scientific computing; furthermore division-free arithmetic...
International audienceRounding to odd is a non-standard rounding on floating-point numbers. By using...
International audienceThe 2008 revision of the IEEE-754 standard, which governs floating-point arith...
International audienceThe most well-known feature of floating-point arithmetic is the limited precis...
23 pagesWe introduce several algorithms for accurately evaluating powers to a positive integer in fl...
The summation of n floating-point numbers is ubiquitous in numerical computations. We present a new ...
International audienceWe introduce an algorithm for multiplying a floating-point number $x$ by a con...
Abstract. Given a vector of floating-point numbers with exact sum s, we present an algorithm for cal...