基于三角函数评估的毕达哥拉斯三元组的范围缩减

Hugues de Lassus Saint-Geniès, D. Defour, G. Revy
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引用次数: 5

摘要

初等函数的软件评估通常需要三个步骤:范围缩减、多项式评估和重建步骤。这些评估方案旨在为给定的精度提供最佳性能,这需要对误差进行精细控制。其中一个主要问题是尽量减少错误来源的数量和/或它们对最终结果的影响。本文提出的工作解决了这个问题,因为它消除了三角函数评估的一个误差来源。我们提出了一种方法,消除了在正弦和余弦计算的第二次范围缩减中使用的表格值的舍入误差。当以正确舍入为目标时,我们表明这样的表更小,并且使重建步骤比现有方法更便宜。这种方法依赖于毕达哥拉斯三元组生成器。最后,我们将展示如何在合理的时间内以最少的内存消耗生成最多10位索引的表。
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Range reduction based on Pythagorean triples for trigonometric function evaluation
Software evaluation of elementary functions usually requires three steps: a range reduction, a polynomial evaluation, and a reconstruction step. These evaluation schemes are designed to give the best performance for a given accuracy, which requires a fine control of errors. One of the main issues is to minimize the number of sources of error and/or their influence on the final result. The work presented in this article addresses this problem as it removes one source of error for the evaluation of trigonometric functions. We propose a method that eliminates rounding errors from tabulated values used in the second range reduction for the sine and cosine evaluation. When targeting correct rounding, we show that such tables are smaller and make the reconstruction step less expensive than existing methods. This approach relies on Pythagorean triples generators. Finally, we show how to generate tables indexed by up to 10 bits in a reasonable time and with little memory consumption.
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