Perverse sheaves and knot contact homology
[Math. Dept.]
June 28, 2018 16:00-17:00
E409 School of Mathematics
![[seminar]20180628Alimjon Eshmatov-01.png](http://tianyuan.scu.edu.cn/upload/default/20180625/%5Bseminar%5D20180628Alimjon%20Eshmatov-01.png "[seminar]20180628Alimjon Eshmatov-01.png")
SPEAKER
Alimjon Eshmatov (University of Toledo)
ABSTRCT
We present a universal construction, called homotopy braid closure, that produces invariants of links in R3 starting with a braid group action on objects of a (model) category. Applying this construction to the natural action of the braid group Bn on the category of perverse sheaves on the two-dimensional disk with singularities at n marked points, we obtain a differential graded (DG) category that gives knot contact homology in the sense of L. Ng. As an application, we show that the category of finite-dimensional modules over the 0-th homology of this DG category is equivalent to the category of perverse sheaves on R3 with singularities at most along the link. [This is joint work with Yu. Berest and Wai-kit Yeung]
SUPPORTED BY
Tianyuan Mathematical Center in Southwest China
School of Mathematics, Sichuan University