Equiaffine immersion, projective flatness and quasi-Codazzi structure

Abstract

In the present paper, we study an extended theory of statistical manifolds in application to affine differential geometry. Any smooth hypersurface M ⊂ Rn+1 with a transverse vector field naturally admits a symmetric (0, 2)-tensor h and a torsion-free connection ∇ on M so that ∇ h is totally symmetric. Here h may be degenerate (i.e., not a pseudo-Riemannian metric) in general. As a generalization of classical theorem due to Weyl, Radon, Nomizu, Kurose and others, we show, roughly saying, that M with is equiaffine if and only if (h, ∇) defines a quasi-Codazzi structure, previously introduced by the author, and it admits a projectively flat dual connection with symmetric Ricci contraction. This is a direct consequence from our quasi-Codazzi theory, which is built in a more general context as a submanifold theory in para-Hermitian geometry.