The Critical Point Equation And Contact Geometry
Abstract
In this paper, we consider the CPE conjecture in the frame-work of K-contact and (, μ)-contact manifolds. First, we prove that if a complete K-contact metric satisfies the CPE is Einstein and is isometric to a unit sphere S2n+1. Next, we prove that if a non-Sasakian (, μ) -contact metric satisfies the CPE, then M3 is flat and for n > 1 , M2n+1 is locally isometric to En+1× Sn(4).
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