Overview
Explore a lecture on the correspondence between Donaldson-Thomas invariants of Calabi-Yau 3-folds and holomorphic curves in complex integrable systems, as proposed by Kontsevich and Soibelman. Delve into a concrete example related to mirror symmetry for the local projective plane, with applications in enumerative geometry. Examine the general correspondence through the lens of N=2 4d quantum field theories and holomorphic Floer theory. This talk, presented by Pierrick Bousseau from the University of Georgia, offers insights into advanced topics in algebraic geometry and mathematical physics, suitable for researchers and graduate students in these fields.
Syllabus
Homological Mirror Symmetry: Pierrick Bousseau, Univ. of Georgia: DT Invariants & Holomorphic Curves
Taught by
IMSA