Smoothing surfaces on fourfolds
Algebraic Geometry
2026-01-14 v1
Abstract
If are vector bundles of ranks on a smooth fourfold and is globally generated, it is well known that the general map is injective and drops rank along a smooth surface. Chang improved on this with a filtered Bertini theorem. We strengthen these results by proving variants in which (a) is not a vector bundle and (b) is not globally generated. As an application, we give examples of even linkage classes of surfaces on in which all integral surfaces are smoothable, including the linkage classes associated with the Horrocks-Mumford surface.
Cite
@article{arxiv.2501.05630,
title = {Smoothing surfaces on fourfolds},
author = {Scott Nollet and A. P. Rao},
journal= {arXiv preprint arXiv:2501.05630},
year = {2026}
}