Large Sets Avoiding Rough Patterns

Abstract

The pattern avoidance problem seeks to construct a set X⊂ Rd with large dimension that avoids a prescribed pattern. Examples of such patterns include three-term arithmetic progressions (solutions to x1 - 2x2 + x3 = 0), or more general patterns of the form f(x1, …, xn) = 0. Previous work on the subject has considered patterns described by polynomials, or by functions f satisfying certain regularity conditions. We consider the case of `rough' patterns, not necessarily given by the zero-set of a function with prescribed regularity. There are several problems that fit into the framework of rough pattern avoidance. As a first application, if Y ⊂ Rd is a set with Minkowski dimension α, we construct a set X with Hausdorff dimension d-α such that X+X is disjoint from Y. As a second application, if C is a Lipschitz curve, we construct a set X ⊂ C of dimension 1/2 that does not contain the vertices of an isosceles triangle.