-η-Ricci solitons and Einstein metrics on a weak β-Kenmotsu manifold
Abstract
Weak almost contact metric manifolds (i.e., the complex structure is replaced by a nonsingular skew-symmetric tensor), defined by the author and R. Wolak, allow a new look at the classical theory and find novel applications. An important case of these manifolds, which is locally a twisted product, is a weak β-Kenmotsu manifold defined by the author and D.S. Patra. In the paper, the concept of the -Ricci tensor is adapted to weak almost contact manifolds, the interaction of the -η-Ricci soliton with the weak β-Kenmotsu structure (with β=const) is studied and new characteristics of Einstein metrics are obtained.
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