Stable Envelopes from 2D Mirror Symmetry
Offered By: M-Seminar, Kansas State University via YouTube
Course Description
Overview
Explore a lecture by Ivan Danilenko from UC Berkeley on stable envelopes derived from 2D mirror symmetry. Delve into the intricacies of homological mirror symmetry and its prediction of equivalence between derived categories of equivariant coherent sheaves and wrapped Fukaya categories. Examine the decategorification process and its implications for K-theory, focusing on the identification of objects in equivariant K-theory with cycles in local systems. Investigate the application of these concepts to fixed point basis and stable envelopes, drawing insights from ongoing research collaborations with Andrey Smirnov, Mina Aganagic, Peng Zhou, and Yixuan Li.
Syllabus
Ivan Danilenko - Stable envelopes from 2d mirror symmetry
Taught by
M-Seminar, Kansas State University
Related Courses
Branes and Quivers in String Theory - Lecture 1International Centre for Theoretical Sciences via YouTube Homological Mirror Symmetry - Coulomb Branches & Rozansky-Witten Theory Pt. II
IMSA via YouTube Homological Mirror Symmetry - Coulomb Branches and Rozansky-Witten Theory
IMSA via YouTube The Curved Cartan Complex Revisited
IMSA via YouTube Coulomb Branches of 3d N=4 Gauge Theories 2
ICTP Mathematics via YouTube