F-manifolds, multi-flat structures and Painlev\'e transcendents

Abstract

In this paper we study F-manifolds equipped with multiple flat connections (and multiple F-products), that are required to be compatible in a suitable sense. In the semisimple case we show that a necessary condition for the existence of such multiple flat connections can be expressed in terms of the integrability of a distribution of vector fields that are related to the eventual identities for the multiple products involved. Using this fact we show that in general there can not be multi-flat structures with more than three flat connections. When the relevant distributions are integrable we construct bi-flat F-manifolds in dimension 2 and 3, and tri-flat F-manifolds in dimensions 3 and 4. In particular we obtain a parametrization of three-dimensional bi-flat F in terms of a system of six first order ODEs that can be reduced to the full family of PVI equation and we construct non-trivial examples of four dimensional tri-flat F manifolds that are controlled by hypergeometric functions. In the second part of the paper we extend our analysis to include non-semisimple multi-flat F-manifolds. We show that in dimension three, regular non-semisimple bi-flat F-manifolds are locally parameterized by solutions of the full PIV and PV equations, according to the Jordan normal form of the endomorphism L=E. Combining this result with the local parametrization of 3-dimensional bi-flat F-manifolds we have that confluences of PIV, PV and PVI correspond to collisions of eigenvalues of L preserving the regularity. Furthermore, we show that contrary to the semisimple situation, it is possible to construct regular non-semisimple multi-flat F-manifolds, with any number of compatible flat connections.