Only finitely many s-Cullen numbers are repunits for a fixed s 2

Abstract

We show that for any integer s ≥ 2, there are only finitely many s-Cullen numbers that are repunits. More precisely, for fixed s 2, there are only finitely many integers n, b, and q with n ≥ 2, b ≥ 2 and q ≥ 3 such that \[Cn,s = nsn + 1 = bq -1b-1.\] The proof is elementary and effective, and it is used to show that there are no s-Cullen repunits, other than explicitly known ones, for all s ∈ [2,8896].

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