HyperKahler contact Distribution in 3-Sasakain Manifolds

Abstract

In this paper, the HyperKahler contact distribution of a 3-Sasakian manifold is studied. To analyze the curvature properties of this distribution, the special metric connection ∇ is defined. This metric connection is completely determined by HyperKahler contact distribution. We prove that HyperKahler contact distribution is of constant holomorphic sectional curvatures if and only if its 3-Sasakian manifold is of constant α-sectional curvatures. Moreover, it is shown that there is an interesting relation between the sectional curvatures of α-planes on TM of metric connection ∇ and the Levi-Civita connection.