Clusters of primes with square-free translates

Abstract

Let R be a finite set of integers satisfying appropriate local conditions. We show the existence of long clusters of primes p in bounded length intervals with p-b squarefree for all b ∈ R. Moreover, we can enforce that the primes p in our cluster satisfy any one of the following conditions: (1) p lies in a short interval [N, N+N712+ε], (2) p belongs to a given inhomogeneous Beatty sequence, (3) with c ∈ (89,1) fixed, pc lies in a prescribed interval mod 1 of length p-1+c+ε.