Common Divisors of Elliptic Divisibility Sequences over Function Fields

Abstract

Let E/k(T) be an elliptic curve defined over a rational function field of characteristic zero. Fix a Weierstrass equation for E. For points R in E(k(T)), write xR=AR/DR2 with relatively prime polynomials AR(T) and DR(T) in k[T]. The sequence DnR) for n 1 is called the ``elliptic divisibility sequence of R.'' Let P,Q in E(k(T)) be independent points. We conjecture that deg (gcd(DnP,DmQ)) is bounded for m,n 1, and that gcd(DnP,DnQ) = gcd(DP,DQ) for infinitely many n 1. We prove these conjectures in the case that j(E) is in k. More generally, we prove analogous statements with k(T) replaced by the function field of any curve and with P and Q allowed to lie on different elliptic curves. If instead k is a finite field of characteristic p, and again assuming that j(E) is in k, we show that deg (gcd(DnP,DnQ)) > n + O(sqrtn) for infinitely many n satisfying gcd(n,p) = 1.

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