From Dual Connections to Almost Contact Structures

Abstract

A dualistic structure on a smooth Riemaniann manifold M is a triple (M,g,∇) with g a Riemaniann metric and ∇ an affine connection, generally assumed to be torsionless. From g and ∇, the dual connection ∇* can be defined and the triple (M, ∇,∇*) is called a statistical manifold, a basic object in information geometry. In this work, we give conditions based on this notion for a manifold to admit an almost contact structure and some related structures: almost contact metric,contact, contact metric, cosymplectic, and coK\"ahler in the three-dimensional case.