Symmetry properties of finite sums involving generalized Fibonacci   numbers

Kunle Adegoke; Oluwaseyi Oshin

arXiv:1709.07312·math.NT·October 4, 2017

Symmetry properties of finite sums involving generalized Fibonacci numbers

Kunle Adegoke, Oluwaseyi Oshin

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TL;DR

This paper explores symmetry properties of finite sums involving generalized Fibonacci numbers, extending previous results to reveal new symmetrical relationships.

Contribution

It introduces new symmetry properties of sums involving generalized Fibonacci numbers, expanding on earlier work by I. J.. Good.

Findings

01

Derived new symmetry identities for generalized Fibonacci sums

02

Extended previous results to broader classes of Fibonacci-like sequences

03

Provided mathematical proofs for the symmetry properties

Abstract

We extend a result of I. J. Good and prove more symmetry properties of sums involving generalized Fibonacci numbers

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Taxonomy

TopicsAdvanced Mathematical Theories and Applications · Quasicrystal Structures and Properties · Advanced Mathematical Identities