English

The minimal exponent and $k$-rationality for local complete intersections

Algebraic Geometry 2023-05-09 v2

Abstract

We show that if ZZ is a local complete intersection subvariety of a smooth complex variety XX, of pure codimension rr, then ZZ has kk-rational singularities if and only if α~(Z)>k+r\widetilde{\alpha}(Z)>k+r, where α~(Z)\widetilde{\alpha}(Z) is the minimal exponent of ZZ. We also characterize this condition in terms of the Hodge filtration on the intersection cohomology Hodge module of ZZ. Furthermore, we show that if ZZ has kk-rational singularities, then the Hodge filtration on the local cohomology sheaf HZr(OX)\mathcal{H}^r_Z(\mathcal{O}_X) is generated at level dim(X)α~(Z)1\dim(X)-\lceil \widetilde{\alpha}(Z)\rceil-1 and, assuming that k1k\geq 1 and ZZ is singular, of dimension dd, that Hk(ΩZdk)0\mathcal{H}^k(\underline{\Omega}_Z^{d-k})\neq 0. All these results have been known for hypersurfaces in smooth varieties.

Cite

@article{arxiv.2212.01898,
  title  = {The minimal exponent and $k$-rationality for local complete intersections},
  author = {Qianyu Chen and Bradley Dirks and Mircea Mustaţă},
  journal= {arXiv preprint arXiv:2212.01898},
  year   = {2023}
}

Comments

21 pages. Comments are welcome!; v2: small changes and some typos are fixed

R2 v1 2026-06-28T07:21:39.281Z