Almost Complex and Hypercomplex Norden Structures Induced by Natural Riemann Extensions

Abstract: The Riemann extension, introduced by E. K. Patterson and A. G. Walker, is a semi-Riemannian metric with a neutral signature on the cotangent bundle T∗M of a smooth manifold M, induced by a symmetric linear connection ∇ on M. In this paper we deal with a natural Riemann extension g¯, which is a generalization (due to M. Sekizawa and O. Kowalski) of the Riemann extension. We construct an almost complex structure J¯ on the cotangent bundle T∗M of an almost complex manifold (M,J,∇) with a symmetric linear connecti… Show more

“…Recently, in [2], the present authors with Blaga studied Kähler manifolds with Norden metric establishing, on these manifolds, the relation between three concepts: constant totally real sectional curvatures, holomorphic Einstein and Bochner flatness. Also, in [1] almost complex and hypercomplex Norden structures induced by natural Riemann extensions were constructed by the present authors.…”

An almost Complex Structure with Norden Metric on the Phase Space

“…Recently, in [2], the present authors with Blaga studied Kähler manifolds with Norden metric establishing, on these manifolds, the relation between three concepts: constant totally real sectional curvatures, holomorphic Einstein and Bochner flatness. Also, in [1] almost complex and hypercomplex Norden structures induced by natural Riemann extensions were constructed by the present authors.…”

An almost Complex Structure with Norden Metric on the Phase Space

Geometric properties of almost pure metric plastic pseudo-Riemannian manifolds