Lower bounds in the polynomial Szemer\'edi theorem

Abstract

We construct large subsets of the first N positive integers which avoid certain arithmetic configurations. In particular, we construct a set of order N0.7685 lacking the configuration \x,x+y,x+y2\, surpassing the N3/4 limit of Ruzsa's construction for sets lacking a square difference. We also extend Ruzsa's construction to sets lacking polynomial differences for a wide class of univariate polynomials. Finally, we turn to multivariate differences, constructing a set of order N1/2 lacking a difference equal to a sum of two squares. This is in contrast to the analogous problem of sets lacking a difference equal to a prime minus one, where the current record is of order No(1).