On Sierpi\'nski and Riesel Repdigits and Repintegers

Abstract

For positive integers b≥ 2, k<b, and t, we say that an integer kb(t) is a b-repdigit if kb(t) can be expressed as the digit k repeated t times in base-b representation, i.e., kb(t) =k(bt-1)/(b-1). In the case of k=1, we say that 1b(t) is a b-repunit. In this article, we investigate the existsence of b-repdigits and b-repunits among the sets of Sierpi\'nski numbers and Riesel numbers. A Sierpi\'nski number is defined as an odd integer k for which k· 2n+1 is composite for all positive integers n and Riesel numbers are similarly defined for the expression k· 2n-1.