Classification of base of warped product almost Ricci solitons

Abstract

In this paper we study a Ricci-Hessian type manifold (M,g,,f,λ) which is closely related to the construction of almost Ricci soliton realized as a warped product. We classify certain classes of the Ricci-Hessian type manifolds and derive some implications for almost Ricci solitons and generalized m--quasi-Einstein manifolds. We consider two complementary cases: ∇ f and ∇ are linearly independent in C∞(M)--module X(M); and ∇ f=h∇ for a smooth function h on M. In the first case we show that the vector field ∇λ belongs to the C∞(M)--module generated by ∇ f and ∇, while in the second case, under additional hypothesis, the manifold is, around any regular point of f, locally isometric to a warped product.