On the second-order tangent bundle with deformed 2-nd lift metric

Abstract

Let (M,g) be a pseudo-Riemannian manifold and T2M be its the second-order tangent bundle equipped with the deformed 2-nd lift metric g which obtained from the 2-nd lift metric by deforming the horizontal part with a symmetric (0,2)-tensor field c. In the present paper, we first compute the Levi-Civita connection and its Riemannian curvature tensor field of (T2M,g). We give necessary and sufficient conditions for (T2M,g) to be semi-symmetric. Secondly, we show that (T2M,g) is a plural-holomorphic B-manifold with the natural integrable nilpotent structure. Finally, we get the conditions under which (T2M,g) with the 2-nd lift of an almost complex structure is an anti-K\"ahler manifold