From Darboux-Egorov system to bi-flat F-manifolds

Abstract

Motivated by the theory of integrable PDEs of hydrodynamic type and by the generalization of Dubrovin's duality in the framework of F-manifolds due to Manin [22], we consider a special class of F-manifolds, called bi-flat F-manifolds. A bi-flat F-manifold is given by the following data (M, ∇1,∇2,,*,e,E), where (M, ) is an F-manifold, e is the identity of the product , ∇1 is a flat connection compatible with and satisfying ∇1 e=0, while E is an eventual identity giving rise to the dual product *, and ∇2 is a flat connection compatible with * and satisfying ∇2 E=0. Moreover, the two connections ∇1 and ∇2 are required to be hydrodynamically almost equivalent in the sense specified in [2]. First we show that, similarly to the way in which Frobenius manifolds are constructed starting from Darboux-Egorov systems, also bi-flat F-manifolds can be built from solutions of suitably augmented Darboux-Egorov systems, essentially dropping the requirement that the rotation coefficients are symmetric. Although any Frobenius manifold possesses automatically the structure of a bi-flat F-manifold, we show that the latter is a strictly larger class. In particular we study in some detail bi-flat F-manifolds in dimensions n=2, 3. For instance, we show that in dimension 3 bi-flat F-manifolds are parametrized by solutions of a two parameters Painlev\'e VI equation, admitting among its solutions hypergeometric functions. Finally we comment on some open problems of wide scope related to bi-flat F-manifolds.