On Diophantine equations involving intersection of Thabit and Williams numbers base b and some ternary recurrent sequences

Abstract

Let Pn be the n-th Padovan number, En be the n-th Perrin number and Nn be the n-th Narayana's cows number. Let b be a positive integer such that b ≥ 2. In this paper, we study the Diophantine equations \[ Pn = (b 1)· bl 1, \] \[ En = (b 1)· bl 1, \] and \[ Nn = (b 1)· bl 1, \] in non-negative integers n, b and positive integer l. As a result, we determine the Padovan, Perrin and Narayana's cows numbers that are Thabit and Williams numbers base b. Moreover, we determine all solutions of the above equations within the range 2 ≤ b ≤ 10.

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