The uniqueness of K-polystable Fano degeneration

Introductory Workshop: Derived Algebraic Geometry and Birational Geometry and Moduli Spaces January 31, 2019 - February 08, 2019

January 31, 2019 (02:00 PM PST - 03:00 PM PST)

Speaker(s): Chenyang Xu (Massachusetts Institute of Technology)
Location: SLMath: Eisenbud Auditorium

Tags/Keywords

K-stability
Fano variety

Primary Mathematics Subject Classification

14K99 - None of the above, but in this section

Secondary Mathematics Subject Classification

14E18 - Arcs and motivic integration

Video

3-Xu

Abstract

(Joint with Harold Blum) We want to show that a family of Fano varieties has a unique K-polystable degeneration. This is one step of the program of constructing a moduli space of K-stable Fano varieties, i.e., proving there is an Artin stack parametrizing K-semistable Fano varieties, which admits a projective good moduli space parametrizing K-polystable Fano varieties.

Supplements

	Notes 618 KB application/pdf	Download

Video/Audio Files

3-Xu

H.264 Video	862_25989_7582_3-Xu.mp4	Download 1080p (3.86 GB) 720p (2.97 GB) 360p (762 MB)

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