Bott Vanishing Using GIT and Quantization

Sebastián Torres

Type: Article

Publication Date: 2023-01-01

Citations: 3

DOI: https://doi.org/10.1307/mmj/20226298

Abstract

A smooth projective variety Y is said to satisfy Bott vanishing if ΩYj⊗L has no higher cohomology for every j and every ample line bundle L. Few examples are known to satisfy this property. Among them are toric varieties, as well as the quintic del Pezzo surface, recently shown by Totaro. Here we present a new class of varieties satisfying Bott vanishing, namely stable GIT quotients of (P1)n by the action of PGL2 over an algebraically closed field of characteristic zero. For this, we use the work done by Halpern-Leistner on the derived category of a GIT quotient and his version of the quantization theorem. We also see that, using similar techniques, we can recover Bott vanishing for the toric case.

Locations

The Michigan Mathematical Journal - View
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Action	Title	Year	Authors
+ PDF Chat	Complexe Cotangent et Déformations I	1971	Luc Illusie
+	Cohomology of Vector Bundles and Syzygies	2003	Jerzy Weyman
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+	Positivity in Algebraic Geometry I	2004	Robert Lazarsfeld
+	On the Hodge structure of projective hypersurfaces in toric varieties	1994	Victor V. Batyrev David A. Cox
+	Fano threefolds with sections in Ω<sup>1</sup><sub><i>V</i></sub> (1)	2006	Priska Jahnke Ivo Radloff
+ PDF Chat	The equations for the moduli space of n points on the line	2009	Benjamin Howard John J. Millson Andrew Snowden Ravi Vakil
+ PDF Chat	The Frobenius morphism on a toric variety	1997	Anders Skovsted Buch Jesper Funch Thomsen Niels Lauritzen V. P. Mehta
+	Moduli spaces of weighted pointed stable curves	2003	Brendan Hassett
+ PDF Chat	Variation of geometric invariant theory quotients	1998	Igor V. Dolgachev Yi Hu