An update on semisimple quantum cohomology and F-manifolds

Abstract

In the first section of this note we show that the Theorem 1.8.1 of Bayer--Manin ([BaMa]) can be strengthened in the following way: if the even quantum cohomology of a projective algebraic manifold V is generically semi--simple, then V has no odd cohomology and is of Hodge--Tate type. In particular, this addressess a question in [Ci]. In the second section, we prove that an analytic (or formal) supermanifold M with a given supercommutative associative OM--bilinear multiplication on its tangent sheaf TM is an F--manifold in the sense of [HeMa], iff its spectral cover as an analytic subspace of the cotangent bundle T*M is coisotropic of maximal dimension. This answers a question of V. Ginzburg. Finally, we discuss these results in the context of mirror symmetry and Landau--Ginzburg models for Fano varieties.