On the width of transitive sets: bounds on matrix coefficients of finite groups

Abstract

We say that a finite subset of the unit sphere in Rd is transitive if there is a group of isometries which acts transitively on it. We show that the width of any transitive set is bounded above by a constant times ( d)-1/2. This is a consequence of the following result: If G is a finite group and : G → Ud(C) a unitary representation, and if v ∈ Cd is a unit vector, there is another unit vector w ∈ Cd such that \[ g ∈ G | (g) v, w | ≤ (1 + c d)-1/2.\] These results answer a question of Yufei Zhao. An immediate consequence of our result is that the diameter of any quotient S(Rd)/G of the unit sphere by a finite group G of isometries is at least π/2 - od → ∞(1).