【2020 Spring】Mirror symmetry: categories and constructions-清华丘成桐数学科学中心

【2020 Spring】Mirror symmetry: categories and constructions

Teacher ：Will Donovan

Schedule： Mon & Wed 13:30-15:05, 2020-3-2 ~ 5-20

Venue：Conference Room 3, Jin Chun Yuan West Bldg.

Description

Mirror symmetry is a collection of conjectural relationships between symplectic and algebraic geometry, inspired by the physics of superstrings. Though it is far from being fully understood, it has already had deep impact in geometry and related fields including representation theory.

According to Kontsevich’s homological mirror symmetry proposal, it may be formulated by equivalences between certain symplectic and algebraic categories. I will introduce these objects, and do some case studies: in particular, I will develop toric geometry of varieties and orbifolds to give a source of examples, and discuss recent progress in understanding mirror symmetry via constructible sheaves.

E-mail：donovan@tsinghua.edu.cn

Prerequisite

Some familiarity with symplectic or algebraic geometry.

Reference

D. Auroux, Topics in Geometry: Mirror Symmetry, MIT Open Course Ware.
R. P. Thomas, Derived categories for the working mathematician, arXiv.
R. P. Thomas, Mirror symmetry and actions of braid groups on derived categories, arXiv.

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