English

Logarithmic vector fields and the Severi strata in the discriminant

Algebraic Geometry 2016-10-25 v2

Abstract

The discriminant, DD, in the base of a miniversal deformation of an irreducible plane curve singularity, is partitioned according to the genus of the (singular) fibre, or, equivalently, by the sum of the delta invariants of the singular points of the fibre. The members of the partition are known as the {\it Severi strata}. The smallest is the δ\delta-constant stratum, D(δ)D(\delta), where the genus of the fibre is 00. It is well known, by work of Givental' and Varchenko, to be Lagrangian with respect to the symplectic form Ω\Omega obtained by pulling back the intersection form on the cohomology of the fibre via the period mapping. We show that the remaining Severi strata are also co-isotropic with respect to Ω\Omega, and moreover that the coefficients of the expression of Ωk\Omega^{\wedge k} with respect to a basis of Ω2k(logD)\Omega^{2k}(\log D) are equations for D(δk+1)D(\delta-k+1), for k=1,,δk=1,\ldots,\delta. These equations allow us to show that for E6E_6 and E8E_8, D(δ)D(\delta) is Cohen-Macaulay (this was already shown by Givental' for A2kA_{2k}), and that, as far as we can calculate, for A2kA_{2k} all of the Severi strata are Cohen-Macaulay. Our construction also produces a canonical rank 2 maximal Cohen Macaulay module on the discriminant.

Keywords

Cite

@article{arxiv.1609.09305,
  title  = {Logarithmic vector fields and the Severi strata in the discriminant},
  author = {Paul Cadman and David Mond and Duco van Straten},
  journal= {arXiv preprint arXiv:1609.09305},
  year   = {2016}
}

Comments

18 pages, new references added

R2 v1 2026-06-22T16:05:15.210Z