The abc Conjecture Implies That Only Finitely Many s-Cullen Numbers Are Repunits

Abstract

Assuming the abc conjecture with ε=1/6, we use elementary methods to show that only finitely many s-Cullen numbers are repunits, aside from two known infinite families. More precisely, only finitely many positive integers s, n, b, and q with s,b ≥ 2 and n,q ≥ 3 satisfy \[Cs,n = nsn + 1 = bq -1b-1.\]