Metric f-contact manifolds satisfying the (,μ)-nullity condition

Abstract

We prove that if the f-sectional curvature at any point p of a (2n+s)-dimensional f-(,μ) manifold with n>1 is independent of the f-section at p, then it is constant on the manifold. Moreover, we also prove that an f-(,μ) manifold which is not an S-manifold is of constant f-sectional curvature if and only if μ=+1 and we give an explicit expression for the curvature tensor field. Finally, we present some examples.