A note on Almost Riemann Soliton and gradient almost Riemann soliton

Abstract

The quest of the offering article is to investigate almost Riemann soliton and gradient almost Riemann soliton in a non-cosymplectic normal almost contact metric manifold M3. Before all else, it is proved that if the metric of M3 is Riemann soliton with divergence-free potential vector field Z, then the manifold is quasi-Sasakian and is of constant sectional curvature -λ, provided α,β = constant. Other than this, it is shown that if the metric of M3 is ARS and Z is pointwise collinear with and has constant divergence, then Z is a constant multiple of and the ARS reduces to a Riemann soliton, provided α,\;β =constant. Additionally, it is established that if M3 with α,\; β = constant admits a gradient ARS (γ,,λ), then the manifold is either quasi-Sasakian or is of constant sectional curvature -(α2-β2). At long last, we develop an example of M3 conceding a Riemann soliton.