On weakly Einstein almost contact manifolds

Abstract

In this article we study almost contact manifolds admitting weakly Einstein metrics. We first prove that if a (2n+1)-dimensional Sasakian manifold admits a weakly Einstein metric then its scalar curvature s satisfies -6≤slant s ≤slant 6 for n=1 and -2n(2n+1)4n2-4n+34n2-4n-1≤slant s ≤slant 2n(2n+1) for n≥slant2. Secondly, for a (2n+1)-dimensional weakly Einstein contact metric (,μ)-manifold with <1, we prove that it is flat or is locally isomorphic to the Lie group SU(2), SL(2), or E(1,1) for n=1 and that for n≥slant2 there are no weakly Einstein metrics on contact metric (,μ)-manifolds with 0<<1. For <0, we get a classification of weakly Einstein contact metric (,μ)-manifolds. Finally, it is proved that a weakly Einstein almost cosymplectic (,μ)-manifold with <0 is locally isomorphic to a solvable non-nilpotent Lie group.