Difference between revisions of "Algebraic Geometry Seminar Fall 2012"

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The schedule for the previous semester is [https://www.math.wisc.edu/wiki/index.php/Algebraic_Geometry_Seminar_Spring_2012 here].
 
The schedule for the previous semester is [https://www.math.wisc.edu/wiki/index.php/Algebraic_Geometry_Seminar_Spring_2012 here].
  
== Spring 2012 ==
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== Fall 2012 ==
  
 
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!align="left" | host(s)  
 
!align="left" | host(s)  
 
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|Novemeber 19 (Monday!)
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|November 19 (Monday!), 4:30pm  in VV B139
 
|[http://www.math.uiuc.edu/~nevins/ Tom Nevins] (UIUC)
 
|[http://www.math.uiuc.edu/~nevins/ Tom Nevins] (UIUC)
|TBA
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|Geometry of (Quantum) Symplectic Resolutions
 
|Dima
 
|Dima
 
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===Tom  Nevins===
 
===Tom  Nevins===
Detailed title/abstract TBA; according to the speaker, the talk will be on the same subject as his [http://www.math.lsa.umich.edu/seminars_events/events_detail.php?id=1416 talk at UMichigan]
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Geometry of (Quantum) Symplectic Resolutions
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Symplectic resolutions and their quantizations play a fundamental role at the intersection of algebraic geometry and representation theory.  Starting from classical examples and constructions, I'll explain what a quantum symplectic resolution is.  I'll describe some basic questions about them and some partial results, and, if there's time, connections to Fukaya categories of real symplectic manifolds.  The talk draws on joint work with McGerty, Dodd, and Bellamy.

Latest revision as of 13:08, 14 November 2012

The seminar meets on Fridays at 2:25 pm in Van Vleck B215.

The schedule for the previous semester is here.

Fall 2012

date speaker title host(s)
November 19 (Monday!), 4:30pm in VV B139 Tom Nevins (UIUC) Geometry of (Quantum) Symplectic Resolutions Dima

Abstract

Tom Nevins

Geometry of (Quantum) Symplectic Resolutions

Symplectic resolutions and their quantizations play a fundamental role at the intersection of algebraic geometry and representation theory. Starting from classical examples and constructions, I'll explain what a quantum symplectic resolution is. I'll describe some basic questions about them and some partial results, and, if there's time, connections to Fukaya categories of real symplectic manifolds. The talk draws on joint work with McGerty, Dodd, and Bellamy.