Curves of genus 2 with (n, n)-decomposable jacobians
Abstract
Let C be a curve of genus 2 and 1:C E1 a map of degree n, from C to an elliptic curve E1, both curves defined over . This map induces a degree n map φ1:1 1 which we call a Frey-Kani covering. We determine all possible ramifications for φ1. If 1:C E1 is maximal then there exists a maximal map 2:C E2, of degree n, to some elliptic curve E2 such that there is an isogeny of degree n2 from the Jacobian JC to E1 × E2. We say that JC is (n,n)-decomposable. If the degree n is odd the pair (2, E2) is canonically determined. For n=3, 5, and 7, we give arithmetic examples of curves whose Jacobians are (n,n)-decomposable.
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