A canonical structure on the tangent bundle of a pseudo- or para-K\"ahler manifold

Abstract

It is a classical fact that the cotangent bundle T* of a differentiable manifold enjoys a canonical symplectic form *. If (,,g,ω) is a pseudo-K\"ahler or para-K\"ahler 2n-dimensional manifold, we prove that the tangent bundle T also enjoys a natural pseudo-K\"ahler or para-K\"ahler structure (,,), where is the pull-back by g of * and is a pseudo-Riemannian metric with neutral signature (2n,2n). We investigate the curvature properties of the pair (,) and prove that: is scalar-flat, is not Einstein unless g is flat, has nonpositive (resp.\ nonnegative) Ricci curvature if and only if g has nonpositive (resp.\ nonnegative) Ricci curvature as well, and is locally conformally flat if and only if n=1 and g has constant curvature, or n>2 and g is flat. We also check that (i) the holomorphic sectional curvature of (,) is not constant unless g is flat, and (ii) in n=1 case, that is never anti-self-dual, unless conformally flat.