大国的积极根隔离

Proceedings of the ACM on International Symposium on Symbolic and Algebraic Computation Pub Date : 2016-07-20 DOI:10.1145/2930889.2930909

Jing-Cao Li, Cheng-Chao Huang, Ming Xu, Zhi-bin Li

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引用次数: 4

摘要

我们考虑一类单变量实数函数——幂函数——它将多项式的整数指数扩展为实数代数指数。我们的目的是将这样一个函数的正根分离成不相交的区间，它可以进一步很容易地计算到任何所需的精度。为此，我们首先根据线性无关指数的数量将多极幂分为简单幂和非简单幂。对于前者，我们提出了一种基于Gelfond—Schneider定理的完全隔离方法。对于后者，完备性取决于Schanuel猜想。最后，实验结果验证了该方法的有效性。

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Positive Root Isolation for Poly-Powers

We consider a class of univariate real functions---poly-powers---that extend integer exponents to real algebraic exponents for polynomials. Our purpose is to isolate positive roots of such a function into disjoint intervals, which can be further easily computed up to any desired precision. To this end, we first classify poly-powers into simple and non-simple ones, depending on the number of linearly independent exponents. For the former, we present a complete isolation method based on Gelfond--Schneider theorem. For the latter, the completeness depends on Schanuel's conjecture. Finally experiential results demonstrate the effectivity of the proposed method.

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Proceedings of the ACM on International Symposium on Symbolic and Algebraic Computation

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