Deforming curves in jacobians to non-jacobians II: curves in C(e), 3≤ e≤ g-3
Abstract
We introduce deformation theoretic methods for determining when a curve X in a non-hyperelliptic jacobian JC will deform with JC to a non-jacobian. We apply these methods to a particular class of curves in symmetric powers C(e) of C where 3≤ e≤ g-3. More precisely, given a pencil g1d of degree d on C, let X be the curve parametrizing divisors of degree e in divisors of g1d (see the paper for the precise scheme-theoretical definition). Under certain genericity assumptions on the pair (C, g1d), we prove that if X deforms infinitesimally out of the jacobian locus with JC then either d=2e, dimH0 (g1d) = e or d=2e+1, dimH0 (g1d) = e+1. The analogous result in the case e=2 without genericity assumptions was proved earlier.
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