Gamma classes and quantum cohomology of Fano manifolds: Gamma conjectures

Abstract

We propose Gamma Conjectures for Fano manifolds which can be thought of as a square root of the index theorem. Studying the exponential asymptotics of solutions to the quantum differential equation, we associate a principal asymptotic class AF to a Fano manifold F. We say that F satisfies Gamma Conjecture I if AF equals the Gamma class GF. When the quantum cohomology of F is semisimple, we say that F satisfies Gamma Conjecture II if the columns of the central connection matrix of the quantum cohomology are formed by GF Ch(Ei) for an exceptional collection Ei in the derived category of coherent sheaves Dbcoh(F). Gamma Conjecture II refines part (3) of Dubrovin's conjecture. We prove Gamma Conjectures for projective spaces and Grassmannians.