Add to ORKGRounded Arithmetic is the traditional way of presenting previous year accounts. The method of showing rounded sums of vectors in which the arithmetic still "adds up" and the errors in the display of the components are bounded by twice the maximum rounding error have been well known for at least 30 years in spite of there being little or nothing in the literature and no attempt to implement this in currently available spread-sheets. This paper extends the method from vectors to accumulator trees, and suggests a heuristic algorithm for the more general accumulator graphs in which nodes accumulate into more than one accumulator. The special case of crosstabulations, in which all nodes accumulate to 2 accumulators represents is consid...
International audienceThe 2019 version of the IEEE 754 Standard for Floating-Point Arithmetic recomm...
Abstract. This paper determines the vertices and surface volumes of all rounding polytopes for the m...
23 pagesWe introduce several algorithms for accurately evaluating powers to a positive integer in fl...
From time to time, people dealing with accounting are faced with the following table rounding proble...
This is an extended version of our ARITH-19 article.This paper presents a study of some basic blocks...
AbstractThere exist several algorithms for the calculation of convergents of a continued fraction. W...
10 pagesInternational audienceThis paper presents a study of some basic blocks needed in the design ...
International audienceDuring any composite computation there is a constant need for rounding interme...
In this thesis we investigate arithmetic subroutines and round-off procedures. An error analysis of ...
International audienceRounding to odd is a non-standard rounding on floating-point numbers. By using...
Models of algorithms of floating-point addition are designed for chopping, correctly rounding and au...
Recurrence relations in mathematics form a very powerful and compact way of looking at a wide range ...
. The usual recursive summation technique is just one of several ways of computing the sum of n floa...
The original publication is available at www.springerlink.comDigit recurrence operations mainly use ...
AbstractThe paper determines the vertices and surface volumes of all rounding polytopes for commonly...
International audienceThe 2019 version of the IEEE 754 Standard for Floating-Point Arithmetic recomm...
Abstract. This paper determines the vertices and surface volumes of all rounding polytopes for the m...
23 pagesWe introduce several algorithms for accurately evaluating powers to a positive integer in fl...
From time to time, people dealing with accounting are faced with the following table rounding proble...
This is an extended version of our ARITH-19 article.This paper presents a study of some basic blocks...
AbstractThere exist several algorithms for the calculation of convergents of a continued fraction. W...
10 pagesInternational audienceThis paper presents a study of some basic blocks needed in the design ...
International audienceDuring any composite computation there is a constant need for rounding interme...
In this thesis we investigate arithmetic subroutines and round-off procedures. An error analysis of ...
International audienceRounding to odd is a non-standard rounding on floating-point numbers. By using...
Models of algorithms of floating-point addition are designed for chopping, correctly rounding and au...
Recurrence relations in mathematics form a very powerful and compact way of looking at a wide range ...
. The usual recursive summation technique is just one of several ways of computing the sum of n floa...
The original publication is available at www.springerlink.comDigit recurrence operations mainly use ...
AbstractThe paper determines the vertices and surface volumes of all rounding polytopes for commonly...
International audienceThe 2019 version of the IEEE 754 Standard for Floating-Point Arithmetic recomm...
Abstract. This paper determines the vertices and surface volumes of all rounding polytopes for the m...
23 pagesWe introduce several algorithms for accurately evaluating powers to a positive integer in fl...