β-almost solitons on almost co-k\"ahler manifolds

Abstract

The object of the present paper is to study β-almost Yamabe solitons and β-almost Ricci solitons on almost co-K\"ahler manifolds. In this paper, we prove that if an almost co-K\"ahler manifold M with the Reeb vector field admits a β-almost Yamabe solitons with the potential vector field or b, where b is a smooth function then manifold is K-almost co-K\"ahler manifold or the soliton is trivial, respectively. Also, we show if a closed (,μ)-almost co-K\"ahler manifold with n>1 and <0 admits a β-almost Yamabe soliton then the soliton is trivial and expanding. Then we study an almost co-K\"ahler manifold admits a β-almost Yamabe soliton or β-almost Ricci soliton with V as the potential vector field, V is a special geometric vector field.