Finite Point configurations in Products of Thick Cantor sets and a Robust Nonlinear Newhouse Gap Lemma

Abstract

In this paper we prove that the set of tuples of edge lengths in K1× K2 corresponding to a finite tree has non-empty interior, where K1,K2⊂ R are Cantor sets of thickness τ(K1)· τ(K2) >1. Our method relies on establishing that the pinned distance set is robust to small perturbations of the pin. In the process, we prove a nonlinear version of the classic Newhouse gap lemma, and show that if K1,K2 are as above and φ: R2× R2 → R is a function satisfying some mild assumptions on its derivatives, then there exists an open set S so that x ∈ S φ(x,K1× K2) has non-empty interior.