Triangles in the Plane and arithmetic progressions in thick compact subsets of Rd

Abstract

This article focuses on the occurrence of 3-point configurations in subsets of Rd of sufficient thickness. We prove that a compact set A⊂ Rd contains a similar copy of any linear 3-point configuration (such as a 3-point arithmetic progression) provided A satisfies a mild Yavicoli-thickness condition and an r-uniformity condition for d≥ 2; or, when d=1, the result holds provided the Newhouse thickness of A is at least 1. Moreover, we prove that compact sets A⊂ R2 contain the vertices of an equilateral triangle (and more generally, the vertices of a similar copy of any given triangle) provided A satisfies a mild Yavicoli-thickness condition and an r-uniformity condition. Further, C× C contains the vertices of an equilateral triangle (and more generally the vertices of a similar copy of any given 3-point configuration) provided the Newhouse thickness of C is at least 1. These are among the first results in the literature to give explicit criteria for the occurrence of 3-point configurations in the plane.These are among the first results in the literature to give explicit criteria for the occurrence of three-point configurations in the plane.