Generalized quasi-statistical structures

Abstract

Given a non-degenerate (0,2)-tensor field h on a smooth manifold M, we consider a natural generalized complex and a generalized product structure on the generalized tangent bundle TM T*M of M and we show that they are ∇-integrable, for ∇ an affine connection on M, if and only if (M,h,∇) is a quasi-statistical manifold. We introduce the notion of generalized quasi-statistical structure and we prove that any quasi-statistical structure on M induces generalized quasi-statistical structures on TM T*M. In this context, dual connections are considered and some of their properties are established. The results are described in terms of Patterson-Walker and Sasaki metrics on T*M, horizontal lift and Sasaki metrics on TM and, when the connection ∇ is flat, we define prolongation of quasi-statistical structures on manifolds to their cotangent and tangent bundles via generalized geometry. Moreover, Norden and Para-Norden structures are defined on T*M and TM.