用交替方法求四数列的Binet型公式

Mathematical Journal of Interdisciplinary Sciences Pub Date : 2019-05-23 DOI:10.15415/mjis.2017.61004

Gautam S. Hathiwala, D. V. Shah

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引用次数: 18

摘要

Tetranacci数的序列{Tn}定义为递归关系Tn= Tn-1 + Tn-2 + Tn-3 + Tn-4;n≥4，初始条件T0=T1=T2=0, T3=1。本文用两种不同的方法得到了Tn的显式公式- binet型公式。我们使用了特征分解和生成函数的概念来得到结果。

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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Binet – Type Formula For The Sequence of Tetranacci Numbers by Alternate Methods

The sequence {Tn} of Tetranacci numbers is defined by recurrence relation Tn= Tn-1 + Tn-2 + Tn-3 + Tn-4; n≥4 with initial condition T0=T1=T2=0 and T3=1. In this Paper, we obtain the explicit formulla-Binet-type formula for Tn by two different methods. We use the concept of Eigen decomposition as well as of generating functions to obtain the result.

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Mathematical Journal of Interdisciplinary Sciences

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