Primitive divisors of sequences associated to elliptic curves over function fields

Abstract

We study the existence of a Zsigmondy bound for a sequence of divisors associated to points on an elliptic curve over a function field. More precisely, let k be an algebraically closed field, let C be a nonsingular projective curve over k, and let K denote the function field of C. Suppose E is an ordinary elliptic curve over K and suppose there does not exist an elliptic curve E0 defined over k that is isomorphic to E over K. Suppose P∈ E(K) is a non-torsion point and Q∈ E(K) is a torsion point of order r. The sequence of points \nP+Q\⊂ E(K) induces a sequence of effective divisors \DnP+Q\ on C. We provide conditions on r and the characteristic of k for there to exist a bound N such that DnP+Q has a primitive divisor for all n≥ N. This extends the analogous result of Verzobio in the case where K is a number field.