-η-Ricci solitons on weak Kenmotsu f-manifolds

Abstract

Recent interest among geometers in f-structures of K. Yano is due to the study of topology and dynamics of contact foliations and generalized A. Weinstein conjectures. Weak metric f-structures, introduced by the author and R. Wolak as a generalization of Hermitian structure, as well as f-structure allow for a fresh perspective on the classical theory. An important case of such manifolds, which is locally a twisted product, is a weak β f-Kenmotsu manifold defined as a generalization of K. Kenmotsu's concept. In this paper, the concept of the -Ricci tensor of S. Tashibana is adapted to weak metric f-manifolds, the interaction of -η-Ricci soliton with the weak β f-Kenmotsu structure is studied and new characteristics of η-Einstein metrics are obtained.