Generalized Sierpi\'nski and Riesel numbers of the form tbt+α

Abstract

Let b≥ 2 be an integer. We call an integer k a b-Sierpi\'nski number if (k+1,b-1)=1 and k· bn+1 is composite for all positive integers n. We similarly call k a b-Riesel number if (k-1,b-1)=1 and k· bn-1 is composite for all positive integers n. An integer that is simultaneously b-Sierpi\'nski and b-Riesel is called a b-Brier number. In this article, we show that for any integer α≠ 0, there are infinitely many b-Sierpi\'nski numbers and infinitely many b-Riesel numbers of the form tbt+α. We further show that when b+1 is not a power of 2, there are infinitely b-Brier number of this form.