Isogenous components of Jacobian surfaces

Abstract

Let X be a genus 2 curve defined over a field K, char K = p ≥ 0, and Jac ( X, ) its Jacobian, where is the principal polarization of Jac ( X) attached to X. Assume that Jac ( X) is (n, n)- geometrically reducible with E1 and E2 its elliptic components. We prove that there are only finitely many curves X (up to isomorphism) defined over K such that E1 and E2 are N-isogenous for n=2 and N=2,3, 5, 7 with Aut (Jac X ) V4 or n = 2, N = 3,5, 7 with Aut (Jac X ) D4. The same holds if n=3 and N=5. Furthermore, we determine the Kummer and the Shioda-Inose surfaces for the above Jac X and show how such results in positive characteristic p>2 suggest nice applications in cryptography.