Counting Plane Cubic Curves over Finite Fields with a Prescribed Number of Rational Intersection Points

Abstract

For each integer k ∈ [0,9], we count the number of plane cubic curves defined over a finite field Fq that do not share a common component and intersect in exactly k\ Fq-rational points. We set this up as a problem about a weight enumerator of a certain projective Reed-Muller code. The main inputs to the proof include counting pairs of cubic curves that do share a common component, counting configurations of points that fail to impose independent conditions on cubics, and a variation of the MacWilliams theorem from coding theory.