In this paper a slightly modification is proposed to the original Wong and Gotos ATA method for the computation of elementary functions in IEEE 754 single precision. The identification of a trade-off leads to the proposition of a different chunk of the mantissa that in turn brings a reduction in the length of the tables. Results are reported for usual elementary functions based on exhaustive simulations. A mixed framework including VHDL and Matlab R is used for those simulations.Facultad de Informátic
Most scientific computations use double precision floating point numbers. Recently, posits as an add...
Abstract—This paper presents a unified architecture for the compact implementation of several key el...
In this thesis, our research focuses on fixed-point arithmetic circuits. Fixed-point representation ...
In this paper a slightly modification is proposed to the original Wong and Gotos ATA method for the ...
International audienceWe describe a new implementation of the elementary transcendental functions ex...
This paper presents a new scheme for the hardware evaluation of functions in fixed-point format, for...
(eng) This paper presents a new scheme for the hardware evaluation of elementary functions, based on...
Many general table-based methods for the evaluation in hardware of elementary functions have been pu...
We give here the results of a four-year search for the worst cases for correct rounding of the major...
AbstractThis paper treats the evaluation of one of the elementary functions on short wordlength comp...
Since the apparition of the first computer, floating point arithmetic have drastically changed. The ...
International audienceThe study of specific hardware circuits for the evaluation of floating-point e...
This article shows that IEEE-754 double-precision correct rounding of the most common elementary fun...
AbstractThis paper is a continuation of a study of numerical software for evaluating elementary func...
This textbook presents the concepts and tools necessary to understand, build, and implement algorith...
Most scientific computations use double precision floating point numbers. Recently, posits as an add...
Abstract—This paper presents a unified architecture for the compact implementation of several key el...
In this thesis, our research focuses on fixed-point arithmetic circuits. Fixed-point representation ...
In this paper a slightly modification is proposed to the original Wong and Gotos ATA method for the ...
International audienceWe describe a new implementation of the elementary transcendental functions ex...
This paper presents a new scheme for the hardware evaluation of functions in fixed-point format, for...
(eng) This paper presents a new scheme for the hardware evaluation of elementary functions, based on...
Many general table-based methods for the evaluation in hardware of elementary functions have been pu...
We give here the results of a four-year search for the worst cases for correct rounding of the major...
AbstractThis paper treats the evaluation of one of the elementary functions on short wordlength comp...
Since the apparition of the first computer, floating point arithmetic have drastically changed. The ...
International audienceThe study of specific hardware circuits for the evaluation of floating-point e...
This article shows that IEEE-754 double-precision correct rounding of the most common elementary fun...
AbstractThis paper is a continuation of a study of numerical software for evaluating elementary func...
This textbook presents the concepts and tools necessary to understand, build, and implement algorith...
Most scientific computations use double precision floating point numbers. Recently, posits as an add...
Abstract—This paper presents a unified architecture for the compact implementation of several key el...
In this thesis, our research focuses on fixed-point arithmetic circuits. Fixed-point representation ...