AbstractReciprocal and root reciprocal functions at “half” and IEEE single precision formats are specified in the AMD 3DNow! instruction set. Implementations in the recently released AMD K6-2 microprocessor are analyzed herein by exhaustive computation and timing loops to ascertain the accuracy and monotonicity properties of the output and throughput/latency cycle counts. Periodicities in stepwise function output were observed and employed to construct an underlying bipartite table that can serve as the core of the respective reciprocal function outputs. The recommended RISC instruction macros generated single precision reciprocals and root reciprocals accurate to a unit in the last place. However, the root reciprocal functions failed to sa...
This paper presents the design and implementation of a reciprocal unit, in which the initial approxi...
Abstract. We describe the implementation of the reciprocal square root — also called inverse square ...
thesisThe calculation of reciprocal square roots is vital to graphics rendering. This computation is...
We develop the foundations for confirming monotonicity of a multi-term reciprocal function approxima...
The reciprocal and square root reciprocal operations are important in several applications such as c...
International audienceThis paper presents an optimized software implementation of the reciprocal squ...
International audienceThis paper presents a simple hardware architecture for computing the seed valu...
6th International Conference on Electrical and Electronics Engineering, ELECO 2009 --5 November 2009...
The computation of the reciprocal of a numerical value is an important ingredient of many algorithms...
Quotients, reciprocals, square roots and square root reciprocals all have the property that infinite...
This paper deals with the computation of reciprocals, square roots, inverse square roots, and some e...
This thesis is about implementing the functions for reciprocal, square root, inverse square root and...
This paper presents an algorithm for evaluating the functions of reciprocal, square root, 2x, and lo...
International audienceWe analyze two fast and accurate algorithms recently presented by Borges for c...
Multiplicative Newton–Raphson and Goldschmidt algorithms are widely used in current processors to im...
This paper presents the design and implementation of a reciprocal unit, in which the initial approxi...
Abstract. We describe the implementation of the reciprocal square root — also called inverse square ...
thesisThe calculation of reciprocal square roots is vital to graphics rendering. This computation is...
We develop the foundations for confirming monotonicity of a multi-term reciprocal function approxima...
The reciprocal and square root reciprocal operations are important in several applications such as c...
International audienceThis paper presents an optimized software implementation of the reciprocal squ...
International audienceThis paper presents a simple hardware architecture for computing the seed valu...
6th International Conference on Electrical and Electronics Engineering, ELECO 2009 --5 November 2009...
The computation of the reciprocal of a numerical value is an important ingredient of many algorithms...
Quotients, reciprocals, square roots and square root reciprocals all have the property that infinite...
This paper deals with the computation of reciprocals, square roots, inverse square roots, and some e...
This thesis is about implementing the functions for reciprocal, square root, inverse square root and...
This paper presents an algorithm for evaluating the functions of reciprocal, square root, 2x, and lo...
International audienceWe analyze two fast and accurate algorithms recently presented by Borges for c...
Multiplicative Newton–Raphson and Goldschmidt algorithms are widely used in current processors to im...
This paper presents the design and implementation of a reciprocal unit, in which the initial approxi...
Abstract. We describe the implementation of the reciprocal square root — also called inverse square ...
thesisThe calculation of reciprocal square roots is vital to graphics rendering. This computation is...