除法和平方根的二次收敛算法的舍入

Conference Record of The Twenty-Ninth Asilomar Conference on Signals, Systems and Computers Pub Date : 1995-10-30 DOI:10.1109/ACSSC.1995.540618

E. Schwarz

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引用次数: 28

摘要

对于许多体系结构(如IEEE 754标准)来说，精确四舍五入的结果是必需的。对于除法和平方根，如果有余数，舍入很容易执行。但对于二次收敛算法，通常不计算余数。过去的实现需要额外的延迟来计算余数，或者以两倍的精度计算近似解，或者产生接近但不精确的解。本文说明了如何在获得额外精度的情况下减少计算余数的额外延迟。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Rounding for quadratically converging algorithms for division and square root

Exactly rounded results are necessary for many architectures such as IEEE 754 standard. For division and square root, rounding is easy to perform if a remainder is available. But for quadratically converging algorithms, the remainder is not typically calculated. Past implementations have required the additional delay to calculate the remainder, or calculate the approximate solution to twice the accuracy, or have resulted in a close but not exact solution. This paper shows how the additional delay of calculating the remainder can be reduced if extra precision is available.

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Conference Record of The Twenty-Ninth Asilomar Conference on Signals, Systems and Computers

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