Combinatorial Aspects of Elliptic Curves

Abstract

Given an elliptic curve C, we study here Nk = #C(Fqk), the number of points of C over the finite field Fqk. This sequence of numbers, as k runs over positive integers, has numerous remarkable properties of a combinatorial flavor in addition to the usual number theoretical interpretations. In particular we prove that Nk = - Wk(q, - N1) where Wk(q,t) is a (q,t)-analogue of the number of spanning trees of the wheel graph. Additionally we develop a determinantal formula for Nk where the eigenvalues can be explicitly written in terms of q, N1, and roots of unity. We also discuss here a new sequence of bivariate polynomials related to the factorization of Nk, which we refer to as elliptic cyclotomic polynomials because of their various properties.