Lucas推广了Narayana奶牛序列中的数

Gulf Journal of Mathematics Pub Date : 2023-08-22 DOI:10.56947/gjom.v15i1.1381

Salifou Nikiema, Japhet Odjoumani

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引用次数: 0

摘要

对于整数n≥0，设{Nn}n≥0是由N0 = 0, N1 = N2 = 1和Nn+3 = Nn+2 + Nn给出的Narayana's cows序列;设{Un}n≥0是由U0 = 0, U1 = 1和Un+2 = aUn+1 + bUn给出的参数为a≥1,b =±1的广义Lucas序列。本文给出了Diophantine方程Nm =Un在正未知数m和n下的有效界，然后用Fibonacci、Pell和平衡序列的情况显式地解出了该方程。

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Lucas generalized numbers in Narayana's cows sequence

Let {Nn}n≥0 be the Narayana's cows sequence given by N0 = 0, N1 = N2 = 1 and Nn+3 = Nn+2 + Nn, for integers n ≥ 0 and let {Un}n ≥ 0 be the generalized Lucas sequence with parameters integers a ≥1, b =±1 given by U0 = 0, U1 = 1 and Un+2 = aUn+1 + bUn, for integers n ≥ 0. In this paper we give effective bounds for the Diophantine equation Nm =Un, in positive unknowns m and n. We then solve explicitly that equation with Fibonacci, Pell and Balancing sequences cases.

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Gulf Journal of Mathematics

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