Recurrence relations for the sections of the generating series of the solution to the multidimensional difference equation

Pub Date : 2021-09-01 DOI:10.35634/vm210305
A. Lyapin, S. S. Akhtamova
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Abstract

In this paper, we study the sections of the generating series for solutions to a linear multidimensional difference equation with constant coefficients and find recurrent relations for these sections. As a consequence, a multidimensional analogue of Moivre's theorem on the rationality of sections of the generating series depending on the form of the initial data of the Cauchy problem for a multidimensional difference equation is proved. For problems on the number of paths on an integer lattice, it is shown that the sections of their generating series represent the well-known sequences of polynomials (Fibonacci, Pell, etc.) with a suitable choice of steps.
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多维差分方程解的生成级数各部分的递推关系
本文研究了一类常系数线性多维差分方程解的生成级数的部分,并得到了这些部分的递推关系。由此,证明了多维差分方程柯西问题初始数据形式对生成序列各部分的合理性的多维类比Moivre定理。对于整数格上的路径数问题,证明了其生成序列的部分代表了众所周知的多项式序列(Fibonacci, Pell等),并选择了适当的步骤。
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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