Counting pairs of conics over finite fields that satisfy the Poncelet n-gon condition

Abstract

An ordered pair of smooth conics satisfies the Poncelet triangle condition if there is a triangle inscribed in the first conic and circumscribed in the second conic. Over a finite field Fq with characteristic greater than 3, Chipalkatti showed that the density of pairs of smooth conics satisfying the Poncelet triangle condition is 1q+O(q-2). We improve this result, showing that the density is exactly q-1q2-q+1. We consider the problem of determining the density of pairs of conics satisfying the Poncelet n-gon condition for larger n. We prove a corrected version of a conjecture of Chipalkatti, showing that the proportion of pairs of smooth conics satisfying the Poncelet tetragon condition is 1q + O(q-3/2). We show that when n is an odd integer coprime to q, the density of pairs of smooth conics satisfying this condition is d(n)-1q+O(q-3/2), where d(n) is the number of divisors of n. More generally, we conjecture that the density of pairs of conics satisfying the Poncelet n-gon condition is d'(n)/q in general, where d'(n) is the number of divisors of n not equal to 1 or 2. Our argument involves analyzing the n-torsion points on a certain elliptic curve over the function field K = Fq(λ).