差分算子Liouville定理的d模方法

Q4 Mathematics New Zealand Journal of Mathematics Pub Date : 2021-09-14 DOI:10.53733/187

Kam Hang Cheng, Y. Chiang, A. Ching

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引用次数: 0

摘要

我们建立了复变函数理论中刘维尔定理的类似物，用不同的差分算子代替微分算子。这通常是通过使用残差映射提取(正式的)泰勒系数来完成的，残差映射测量具有局部“不定积分”的障碍物。残差映射基于一个Weyl代数或$q$-Weyl代数结构，每个相应的算子都满足该Weyl代数结构。这就解释了本文中刘维尔定理的不同类比所要求的不同意义上的“有界性”。

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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D-module approach to Liouville's Theorem for difference operators

We establish analogues of Liouville's theorem in the complex function theory, with the differential operator replaced by various difference operators. This is done generally by the extraction of (formal) Taylor coefficients using a residue map which measures the obstruction having local "anti-derivative". The residue map is based on a Weyl algebra or $q$-Weyl algebra structure satisfied by each corresponding operator. This explains the different senses of "boundedness" required by the respective analogues of Liouville's theorem in this article.

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