Potentially Du Bois spaces
Patrick Graf and Sándor J. Kovács
Journal of Singularities
volume 8 (2014), 117-134
Received: 18 February 2014. Received in revised form: 14 October 2014.
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Abstract:
We investigate properties of potentially Du Bois singularities, that is, those that occur on the underlying space of a Du Bois pair. We show that a normal variety X with potentially Du Bois singularities and Cartier canonical divisor K_X is necessarily log canonical, and hence Du Bois. As an immediate corollary, we obtain the Lipman-Zariski conjecture for varieties with potentially Du Bois singularities. We also show that for a normal surface singularity, the notions of Du Bois and potentially Du Bois singularities coincide. In contrast, we give an example showing that in dimension at least three, a normal potentially Du Bois singularity x in X need not be Du Bois even if one assumes the canonical divisor K_X to be Q-Cartier.
Keywords:
Singularities of the minimal model program, Du Bois pairs, differential forms, Lipman-Zariski conjecture
Mathematical Subject Classification:
14B05, 32S05
Author(s) information:
| Patrick Graf | Sándor Kovács |
| Lehrstuhl für Mathematik I | Department of Mathematics, Box 354350 |
| Universität Bayreuth | University of Washington |
| 95440 Bayreuth, Germany | Seattle, WA 98195-4350, USA |
| email: patrick.graf@uni-bayreuth.de | email: skovacs@uw.edu |
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