Almost Ricci solitons on Finsler spaces

Abstract

In this paper, (gradient) almost Ricci solitons on Finsler measure spaces (M, F, m) are introduced and investigated. We prove that (M, F, m) is a gradient almost Ricci soliton if and only if the infinity-Ricci curvature Ric∞ is a scalar function on M when M is compact. Moreover, we give an equivalent characterization of (gradient) almost Ricci solitons for Randers metrics F=α+β, which implies that every Randers (gradient) almost Ricci soliton is of isotropic SBH-curvature. Based on this and the navigation technique, we further classify Randers almost Ricci solitons (resp. gradient almost Ricci solitons) up to classifications of Randers Einstein metrics F (resp. Riemannian gradient almost Ricci solitons) and the homothetic vector fields of F (resp. solutions of the equation which the weight function f of m satisfies) when F has isotropic SBH-curvature. As applications, we obtain some rigidity results for compact Randers (gradient) Ricci solitons and construct several Randers gradient Ricci solitons, which are the first nontrivial examples of gradient Ricci solitons in Finsler geometry.