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- Title
—组关于 Fibonacci 数列及 Lucas 数列的恒等式.
- Authors
陈国慧
- Abstract
There exists the summation problem about the convolution sums of second-order linear recursion sequences. Given the definition and properties of Fibonacci and Lucas polynomials, based on the existing research results, by using the elementary method and the power series expansion of exponential function, some new calculation formulas of these second-order linear recursion sequence are obtained. In addition, by analyzing and generalizing these new results, a series of interesting identities are obtained.
- Subjects
POWER series; EXPONENTIAL functions; MATHEMATICAL convolutions; POLYNOMIALS; HERMITE polynomials
- Publication
Basic Sciences Journal of Textile Universities / Fangzhi Gaoxiao Jichu Kexue Xuebao, 2019, Vol 32, Issue 3, p289
- ISSN
1006-8341
- Publication type
Article
- DOI
10.13338/j.issn.1006-8341.2019.03.010