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On the sum of powers of terms of a linear recurrence sequence
Authors:Ana Paula Chaves  Diego Marques  Alain Togbé
Affiliation:1. Departamento de Matem??tica, Universidade de Bras??lia, Bras??lia, 70910-900, Brazil
2. Department of Mathematics, Purdue University North Central, 1401 S, U.S. 421, Westville, IN, 46391, USA
Abstract:Let (F n ) n??0 be the Fibonacci sequence given by F n+2 = F n+1 + F n , for n ?? 0, where F 0 = 0 and F 1 = 1. There are several interesting identities involving this sequence such as F n 2 + F n+1 2 = F 2n+1, for all n ?? 0. In a very recent paper, Marques and Togbé proved that if F n s + F n+1 s is a Fibonacci number for all sufficiently large n, then s = 1 or 2. In this paper, we will prove, in particular, that if (G m ) m is a linear recurrence sequence (under weak assumptions) and G n s + ... + G n+k s ?? (G m ) m , for infinitely many positive integers n, then s is bounded by an effectively computable constant depending only on k and the parameters of G m .
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