A remark on periods of periodic sequences modulo $m$

Shoji Yokura

arXiv:2006.12002·math.NT·June 23, 2020

A remark on periods of periodic sequences modulo $m$

Shoji Yokura

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TL;DR

This paper derives a formula for the period of partial sum sequences of periodic sequences modulo m and generalizes a Fibonacci sum formula to sequences defined by arbitrary initial conditions.

Contribution

It provides a new formula for the period of partial sum sequences modulo m and extends Fibonacci sum identities to generalized Fibonacci sequences.

Findings

01

Formula for the period of partial sum sequences modulo m.

02

Generalized sum formula for Fibonacci-like sequences.

03

Extension of Fibonacci sum identities to broader sequences.

Abstract

Let ${G_{n}}$ be a periodic sequence of integers modulo $m$ and let ${S G_{n}}$ be the partial sum sequence defined by $S G_{n} := \sum_{k = 0}^{n} G_{k}$ (mod $m$ ). We give a formula for the period of ${S G_{n}}$ . We also show that for a generalized Fibonacci sequence $F (a, b)_{n}$ such that $F (a, b)_{0} = a$ and $F (a, b)_{1} = b$ , we have $S^{i} F (a, b)_{n} = S^{i - 1} F (a, b)_{n + 2} - (i - 2 n + i) a - (i - 1 n + i) b$ where $S^{i} F (a, b)_{n}$ is the i-th partial sum sequence successively defined by $S^{i} F (a, b)_{n} := \sum_{k = 0}^{n} S^{i - 1} F (a, b)_{k}$ . This is a generalized version of the well-known formula $k = 0 \sum n F_{k} = F_{n + 2} - 1$ of the Fibonacci sequence $F_{n}$ .

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Taxonomy

TopicsMathematical Dynamics and Fractals · Advanced Differential Equations and Dynamical Systems · Cellular Automata and Applications