The Green-Tao theorem for Piatetski-Shapiro primes
arXiv:1901.09372
Abstract
Let $m\geq 3$. Suppose that $$ 1-2^{-2^{m^24^m}}<γ<1. $$ Then the set $$ \{p\text{ prime}:\, p=[n^{\frac1γ}]\text{ for some }n\in{\mathbb N}\} $$ contains infinitely many non-trivial $m$-term arithmetic progressions.
This is a preliminary draft, which maybe contains some mistakes