Conformal Submersion with Horizontal Distribution

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 ∇ and ∇ on manifold M and ∇* and ∇* on manifold B, we show that π: (M,∇) (B, ∇*) is a conformal submersion with horizontal distribution if and only if π: (M,∇) (B, ∇*) is a conformal submersion with horizontal distribution. Also, we obtained a necessary and sufficient condition for π σ to become a geodesic of B if σ is a geodesic of M for π: (M,∇,gm) → (B,∇*,gb) a conformal submersion with horizontal distribution.