English

Conformal Submersion with Horizontal Distribution

Differential Geometry 2021-11-25 v1

Abstract

In this article, conformal submersion with horizontal distribution of Riemannian manifolds is defined which is a generalization of the affine submersion with horizontal distribution. Then, a necessary condition is obtained for the existence of a conformal submersion with horizontal distribution. For the dual connections \nabla and \overline{\nabla} on manifold M\mathbf{M} and \nabla^* and \overline{\nabla}^* on manifold B\mathbf{B}, we show that π:(M,)(B,)\pi: (\mathbf{M},\nabla) \longrightarrow (\mathbf{B}, \nabla^{*}) is a conformal submersion with horizontal distribution if and only if π:(M,)(B,)\pi: (\mathbf{M},\overline{\nabla}) \longrightarrow (\mathbf{B}, \overline{\nabla^{*}}) is a conformal submersion with horizontal distribution. Also, we obtained a necessary and sufficient condition for πσ\pi \circ \sigma to become a geodesic of B\mathbf{B} if σ\sigma is a geodesic of M\mathbf{M} for π:(M,,gm)(B,,gb) \pi: (\mathbf{M},\nabla,g_{m}) \rightarrow (\mathbf{B},\nabla^{*},g_{b}) a conformal submersion with horizontal distribution.

Keywords

Cite

@article{arxiv.2111.12501,
  title  = {Conformal Submersion with Horizontal Distribution},
  author = {Mahesh T and K S Subrahamanian Moosath},
  journal= {arXiv preprint arXiv:2111.12501},
  year   = {2021}
}
R2 v1 2026-06-24T07:50:32.551Z