How large dimension guarantees a given angle?

Abstract

We study the following two problems: (1) Given n 2 and , how large Hausdorff dimension can a compact set A have if A does not contain three points that form an angle ? (2) Given and , how large Hausdorff dimension can a %compact subset A of a Euclidean space have if A does not contain three points that form an angle in the -neighborhood of ? An interesting phenomenon is that different angles show different behaviour in the above problems. Apart from the clearly special extreme angles 0 and 180, the angles 60,90 and 120 also play special role in problem (2): the maximal dimension is smaller for these special angles than for the other angles. In problem (1) the angle 90 seems to behave differently from other angles.