N(k)-contact metric as -conformal Ricci soliton

Abstract

The aim of this paper is characterize a class of contact metric manifolds admitting -conformal Ricci soliton. It is shown that if a (2n + 1)-dimensional N(k)-contact metric manifold M admits -conformal Ricci soliton or -conformal gradient Ricci soliton, then the manifold M is -Ricci at and locally isometric to the Riemannian of a flat (n + 1)-dimensional manifold and an n-dimensional manifold of constant curvature 4 for n > 1 and flat for n = 1. Further, for the first case, the soliton vector field is conformal and for the -gradient case, the potential function f is either harmonic or satisfy a Poisson equation. Finally, an example is presented to support the results.