Roth's Theorem in the Piatetski-Shapiro primes

Abstract

Let P denote the set of prime numbers and, for an appropriate function h, define a set Ph=\p∈P: ∃n∈N\ p= h(n)\. The aim of this paper is to show that every subset of Ph having positive relative upper density contains a nontrivial three-term arithmetic progression. In particular the set of Piatetski--Shapiro primes of fixed type 71/72<γ<1, i.e. \p∈P: ∃n∈N\ p= n1/γ\ has this feature. We show this by proving the counterpart of Bourgain--Green's restriction theorem for the set Ph.