Videolibrary
RUS  ENG    JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB  
Video Library
Archive
Most viewed videos

Search
RSS
New in collection






Conference in honour of Fedor Bogomolov's 70th birthday
September 29, 2016 12:00–13:00, Moscow, Higher School of Economics
 


Perverse coherent sheaves on hyperkahler manifolds and Weil conjectures

Misha Verbitsky

Abstract: In Beilinson-Bernstein-Deligne (BBD), Weil conjectures were interpreted as a teorem about purity of a direct image of a pure perverse sheaf. Coherent sheaves on a general (non-algebraic) deformation of hyperkahler manifold have all singularities in codimension 2, which allows one to define a self-dial middle perversity on this category. However, the category of coherent sheaves on a general hyperkahler variety admits a full embedding to the category of coherent sheaves on any its deformation (and is essentially independent on the deformation), hence the notion of “perverse coherent sheaf” makes sense on algebraic hyperkahler manifolds as well.
Instead of fixing the Frobenius action, as in the BBD setup, one should fix the lifting of the sheaf to the twistor space. The role of weight filtration is played by the $O(i)$-filtration on the sheaf restricted to the rational curves in the twistor space (the corresponding filtration is actually the Harder-Narasimhan filtration on the sheaves over twistor spaces). The hyperkahler version of “Weil conjectures” predicts that the weights are increased under pushforwards, and the pushforwards of pure perverse sheaves remain pure, which is actually true, at least in the smooth case.

Language: English
 
  Contact us:
 Terms of Use  Registration to the website  Logotypes © Steklov Mathematical Institute RAS, 2024