Quantum cohomology as a deformation of symplectic cohomology

Abstract: When M is a Fano variety and D is an anticanonical divisor in M, mirror symmetry suggests that the quantum cohomology of M should be a deformation of the symplectic cohomology of M \ D. We prove that this holds under even weaker hypotheses on D (although not in general), and explain the consequences for mirror symmetry. We also explain how our methods give rise to interesting symplectic rigidity results for subsets of M. Along the way we hope to give a brief introduction to Varolgunes' `relative symplectic cohomology', which is the key technical tool used to prove our symplectic rigidity results, but which is of far broader significance in symplectic topology and mirror symmetry as it makes the computation of quantum cohomology `local'. This is joint work with Strom Borman, Mohamed El Alami, and Umut Varolgunes.

algebraic geometrydifferential geometrysymplectic geometry

Audience: researchers in the topic

Geometria em Lisboa (IST)

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