The prime number theorem over integers of power-free polynomial values
Abstract
Let f(x)∈ Z[x] be an irreducible polynomial of degree d 1. Let k2 be an integer. The number of integers n such that f(n) is k-free is widely studied in the literature. In principle, one expects that f(n) is k-free infinitely often, if f has no fixed k-th power divisor. In 2022, Bergelson and Richter established a new dynamical generalization of the prime number theorem (PNT). Inspired by their work, one may expect that this generalization of the PNT also holds over integers of power-free polynomial values. In this note, we establish such variants of Bergelson and Richter's theorem for several polynomials studied by Estermann, Hooley, Heath-Brown, Booker and Browning.
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