A classification of certain almost $\alpha$-Kenmotsu manifolds

TL;DR

This paper classifies certain almost $ ext{alpha}$-Kenmotsu manifolds using canonical connections, revealing their local geometry and linking them to Lie groups, with a focus on $CR$-integrability and invariants.

Contribution

It introduces a new classification framework for almost $ ext{alpha}$-Kenmotsu manifolds based on canonical connections and $CR$-structure analysis, extending understanding of their local geometry.

Findings

Manifolds are characterized by the spectrum of $h'$ and dimension.

Local geometry is determined by the canonical connection with parallel torsion and curvature.

Classification yields a scalar invariant for $( ext{kappa}, ext{mu})'$-spaces.

Abstract

We study $\mathcal D$-homothetic deformations of almost $\alpha$-Kenmotsu structures. We characterize almost contact metric manifolds which are $CR$-integrable almost $\alpha$-Kenmotsu manifolds, through the existence of a canonical linear connection, invariant under $\mathcal D$-homothetic deformations. If the canonical connection associated to the structure $(\varphi,\xi,\eta,g)$ has parallel torsion and curvature, then the local geometry is completely determined by the dimension of the manifold and the spectrum of the operator $h'$ defined by $2\alpha h'=({\mathcal L}_\xi\varphi)\circ\varphi$. In particular, the manifold is locally equivalent to a Lie group endowed with a left invariant almost $\alpha$-Kenmotsu structure. In the case of almost $\alpha$-Kenmotsu $(\kappa,\mu)'$-spaces, this classification gives rise to a scalar invariant depending on the real numbers $\kappa$ and $\alpha$.