Clairaut Riemannian maps
Abstract
In this paper, first we define Clairaut Riemannian map between Riemannian manifolds by using a geodesic curve on the base space and find necessary and sufficient conditions for a Riemannian map to be Clairaut with a non-trivial example. We also obtain necessary and sufficient condition for a Clairaut Riemannian map to be harmonic. Thereafter, we study Clairaut Riemannian map from Riemannian manifold to Ricci soliton with a non-trivial example. We obtain scalar curvatures of and by using Ricci soliton. Further, we obtain necessary conditions for the leaves of to be almost Ricci soliton and Einstein. We also obtain necessary condition for the vector field to be conformal on and necessary and sufficient condition for the vector field to be Killing on , where is a geodesic curve on the base space of Clairaut Riemannian map. Also, we obtain necessary condition for the mean curvature vector field of to be constant. Finally, we introduce Clairaut anti-invariant Riemannian map from Riemannian manifold to K\"ahler manifold, and obtain necessary and sufficient condition for an anti-invariant Riemannian map to be Clairaut with a non-trivial example. Further, we find necessary condition for to be minimal and totally geodesic. We also obtain necessary and sufficient condition for Clairaut anti-invariant Riemannian maps to be harmonic.
Cite
@article{arxiv.2108.01449,
title = {Clairaut Riemannian maps},
author = {Kiran Meena and Akhilesh Yadav},
journal= {arXiv preprint arXiv:2108.01449},
year = {2023}
}
Comments
22 pages. arXiv admin note: text overlap with arXiv:2107.01049