English

Conformal vector fields on almost Kenmotsu manifolds

Differential Geometry 2024-02-05 v1

Abstract

In this paper, first we consider that the conformal vector field X\mathbf{X} is identical with the Reeb vector field ς\varsigma and next, assume that X\mathbf{X} is pointwise collinear with %the Reeb vector field ς\varsigma, in both cases it is shown that the manifold N2m+1\mathbf{N}^{2m+1} becomes a Kenmotsu manifold and N2m+1\mathbf{N}^{2m+1} is locally a warped product N×fM2m\mathbf{N}' \times_{f} \mathbf{M}^{2m}, where M2m\mathbf{M}^{2m} is an almost K\"ahler manifold, N\mathbf{N}' is an open interval with coordinate t, and f=cetf = ce^{t} for some positive constant c. Beside these, we prove that if a (k,μ)(\verb"k",\boldsymbol{\mu})'-almost Kenmotsu manifold admits a Killing vector field X\mathbf{X}, then either it is locally a warped product of an almost K\"ahler manifold and an open interval or X\mathbf{X} is a strict infinitesimal contact transformation. Furthermore, we also investigate η\boldsymbol{\eta}-Ricci-Yamabe soliton with conformal vector fields on (k,μ)(\verb"k",\boldsymbol{\mu})'-almost Kenmotsu manifolds and finally, we construct an example.

Keywords

Cite

@article{arxiv.2402.01425,
  title  = {Conformal vector fields on almost Kenmotsu manifolds},
  author = {Uday Chand De and Arpan Sardar and Krishnendu De},
  journal= {arXiv preprint arXiv:2402.01425},
  year   = {2024}
}
R2 v1 2026-06-28T14:35:52.989Z