Properties of modified Riemannian extensions

Abstract

Let M be an n-dimensional differentiable manifold with a symmetric connection ∇ and TM be its cotangent bundle. In this paper, we study some properties of the modified Riemannian extension % g∇,c on TM defined by means of a symmetric % (0,2)-tensor field c on M. We get the conditions under which TM endowed with the horizontal lift HJ of an almost complex structure J and with the metric g∇,c is a K\"ahler-Norden manifold. Also curvature properties of the Levi-Civita connection and another metric connection of the metric g∇,c are presented.