Gorenstein singularities with Gm-action and moduli spaces of holomorphic differentials

Abstract

Given a holomorphic differential on a smooth complex algebraic curve, we associate to it a Gorenstein curve singularity with Gm-action via a test configuration. This construction decomposes the strata of holomorphic differentials with prescribed orders of zeros into negatively graded miniversal deformation spaces of such singularities. Additionally, it provides a natural description for the singular curves that appear in the boundary of the miniversal deformation spaces. Our approach leads to a number of applications. We classify the unique Gorenstein singularity with Gm-action for each nonvarying stratum of holomorphic differentials and study when these nonvarying strata can be compactified by weighted projective spaces. Moreover, extending the classical results about ADE singularities, we establish the K(π,1)-property for non-hypersurface complete intersection singularities of type U7, U8, U9, and Sk. We also study singularities with bounded α-invariants in the log minimal model program for Mg and utilize them to bound the slopes of effective divisors in Mg. Finally, we show that the loci of subcanonical points with fixed semigroups have trivial tautological rings and provide a criterion to determine whether they are affine varieties.