Publication

Tilting Bundles on Hypertoric Varieties

Journal Contribution - Journal Article

Recently McBreen and Webster constructed a tilting bundle on a smooth hypertoric variety (using reduction to finite characteristic) and showed that its endomorphism ring is Koszul. In this short note we present alternative proofs for these results. We simply observe that the tilting bundle constructed by Halpern-Leistner and Sam on a generic open Geometric Invariant Theory substack of the ambient linear space restricts to a tilting bundle on the hypertoric variety. The fact that the hypertoric variety is defined by a quadratic regular sequence then also yields an easy proof of Koszulity.

Journal: INTERNATIONAL MATHEMATICS RESEARCH NOTICES

ISSN: 1073-7928

Issue: 2

Volume: 2021

Pages: 1034 - 1042

Publication year:2021

DOI: https://doi.org/10.1093/imrn/rnz218
Handle: http://hdl.handle.net/1942/34163
WoS Id: 000629746800005

BOF-keylabel:yes

IOF-keylabel:yes

BOF-publication weight:2

Authors from:Higher Education

Accessibility:Open

See also: Tilting bundles on hypertoric varieties

Publication

Tilting Bundles on Hypertoric Varieties

Journal Contribution - Journal Article

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