English

The perfect power problem for elliptic curves over function fields

Number Theory 2014-12-01 v1

Abstract

We generalise the Siegel-Voloch theorem about S-integral points on elliptic curves as follows: let K/F denote a global function field over a finite field F of characteristic p>3, let S denote a finite set of places of K and let E/K denote a non-isotrivial elliptic curve over K with j-invariant a p^s power but not p^(s+1) power in K. Fix a non-constant function f in K(E) with a pole of order N>0 at the zero element of E. We prove that there are only finitely many rational points P in E(K) such that for any valuation outside S for which f(P) is negative, that valuation of f(P) is divisible by some integer not dividing p^sN. We also present some effective bounds for certain elliptic curves over rational function fields, and indicate how a similar result can be proven over number fields, assuming the number field abc-hypothesis.

Keywords

Cite

@article{arxiv.1411.7787,
  title  = {The perfect power problem for elliptic curves over function fields},
  author = {Gunther Cornelissen and Jonathan Reynolds},
  journal= {arXiv preprint arXiv:1411.7787},
  year   = {2014}
}

Comments

18 pages

R2 v1 2026-06-22T07:14:50.485Z