Syzygies of Abelian and Bielliptic Surfaces in P4
Abstract
So far only six families of smooth irregular surfaces are known to exist in P4 (up to pullbacks by suitable finite covers of P4). These are the elliptic quintic scrolls, the minimal abelian and bielliptic surfaces (of degree 10), two different families of non-minimal abelian surfaces of degree 15, and one family of non-minimal bielliptic surfaces of degree 15. The main purpose of the paper is to describe the structure of the Hartshorne-Rao modules and the syzygies for each of these smooth irregular surfaces in P4, providing at the same time a unified construction method (via syzygies) for these families of surfaces.
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