Аннотация:
In a talk given at HSE in 2019, I proposed a way to apply genus zero
Gromov-Witten invariants to questions of rationality of algebraic
varieties. The main idea is based on a loose analogy with the
morsification of an isolated critical point of a holomorphic function.
The cohomology of any smooth projective variety defined over a field of
characteristic zero (not necessarily algebraically closed) splits
non-canonically into the sum of so-called atoms, whose isomorphism
classes as noncommutative motives are canonical. Recently Hiroshi
Iritani proved so-called blowup formula for quantum cohomology, which is
the key result for the program, and describes the structure of atoms for
the blowup. Based on Iritani's result one can conclude now e.g. that the
very general cubic 4-fold is not rational. I'll give a review of new
invariants, and propose several conjectures refining the structure of
atoms and related to Bridgeland stability structures on derived
categories of coherent sheaves. The talk is based on the ongoing project
with L. Katzarkov, T. Pantev and T. Yu, as well as a related another
project with D. Auroux and L. Katzarkov.