The log canonical threshold and rational singularities
Abstract
We show that if is a nonzero, noninvertible function on a smooth complex variety and is the Jacobian ideal of , then if and only if the hypersurface defined by has rational singularities. Moreover, if it does not have rational singularities, then . We give two proofs, one relying on arc spaces and one that goes through the inequality , where is the minimal exponent of . In the case of a polynomial over , we also prove an analogue of this latter inequality, with replaced by the motivic oscillation index . We also show a part of Igusa's strong monodromy conjecture, for poles larger than . We end with a discussion of lct-maximal ideals: these are ideals with the property that for every with .
Cite
@article{arxiv.2202.08425,
title = {The log canonical threshold and rational singularities},
author = {Raf Cluckers and János Kollár and Mircea Mustaţă},
journal= {arXiv preprint arXiv:2202.08425},
year = {2025}
}
Comments
This supersedes arXiv:1901.08111. V.2: final version, to appear in the special volume of Alg. Geom. Phys. in honor of Yuri I. Manin