Infinite polynomial patterns in large subsets of the rational numbers

Abstract: Inspired by a question of Kra, Moreira, Richter, and Robertson, we prove two new results about infinite polynomial configurations in large subsets of the rational numbers. First, given a finite coloring of $\mathbb{Q}$, we show that there exists an infinite set $B = {b_n : n \in \mathbb{N}} \subseteq \mathbb{Q}$ such that ${b_i, b_i^2 + b_j : i < j}$ is monochromatic. Second, we prove that every subset of positive density in the rational numbers contains a translate of such an infinite configuration. The proofs build upon methods developed in a series of papers by Kra, Moreira, Richter, and Robertson to translate from combinatorics into dynamics, where the core of the argument reduces to understanding the behavior of certain polynomial ergodic averages. The new dynamical tools required for this analysis are a Wiener--Wintner theorem for polynomially-twisted ergodic averages in $\mathbb{Q}$-systems and a structure theorem for Abramov $\mathbb{Q}$-systems. The end of the paper includes a discussion of related problems in the integers.