Critical k-Very Ampleness for Abelian Surfaces
Abstract
Let (S,L) be a polarized abelian surface of Picard rank one and let φ be the function which takes each ample line bundle L' to the least integer k such that L' is k-very ample but not (k+1)-very ample. We use Bridgeland's stability conditions and Fourier-Mukai techniques to give a closed formula for φ(Ln) as a function of n showing that it is linear in n for n>1. As a byproduct, we calculate the walls in the Bridgeland stability space for certain Chern characters.
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