Bisector energy and pinned distances in positive characteristic

Abstract

We prove a new lower bound for the number of pinned distances over finite fields: if A is a sufficiently small subset of Fq2, then there is an element in A that determines |A|2/3 distinct distances to other elements of A. Combined with results for large subsets A⊂eqFq2, this improves all previously known lower bounds on distinct distances over finite fields. In fact, we obtain an upper bound for the number of isosceles triangles determined by A. For that we use the concept of bisector energy. It turns out that the latter can be expressed as a point-plane incidence bound, so one can use a theorem of the third author. The conversion to this incidence problem relies on the Blaschke-Gr\"unwald kinematic mapping -- an embedding of the group of rigid motions of Fq2 into an open subset of the projective three space. This has long been known in kinematics and geometric algebra; we provide a proof for arbitrary fields using Clifford algebras.