Higher Du Bois and higher rational singularities
Abstract
We prove that the higher direct images of the sheaves of relative K\"ahler differentials are locally free and compatible with arbitrary base change for flat proper families whose fibers have -Du Bois local complete intersection singularities, for and all , generalizing a result of Du Bois (the case ). We then propose a definition of -rational singularities extending the definition of rational singularities, and show that, if is a -rational variety with either isolated or local complete intersection singularities, then is -Du Bois. As applications, we discuss the behavior of Hodge numbers in families and the unobstructedness of deformations of singular Calabi-Yau varieties. In an appendix, Morihiko Saito proves that, in the case of hypersurface singularities, the -rationality definition proposed here is equivalent to a previously given numerical definition for -rational singularities. As an immediate consequence, it follows that for hypersurface singularities, -Du Bois singularities are -rational. This statement has recently been proved for all local complete intersection singularities by Chen-Dirks-Musta\c{t}\u{a}.
Keywords
Cite
@article{arxiv.2205.04729,
title = {Higher Du Bois and higher rational singularities},
author = {Robert Friedman and Radu Laza},
journal= {arXiv preprint arXiv:2205.04729},
year = {2025}
}
Comments
with an Appendix by Morihiko Saito; 27 pages; v5 - minor typos corrected, references updated; v4 - final version, to appear in Duke Math. J.; minor edits, typos corrected, some references added; v3 - minor update (some references added, some typos corrected); v2 - substantial additions, now it includes the case of higher rational singularities; title changed to better reflect the content