English

Clairaut Riemannian maps

Differential Geometry 2023-09-19 v7

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 rangeFrangeF_\ast and (rangeF)(rangeF_\ast)^\bot by using Ricci soliton. Further, we obtain necessary conditions for the leaves of rangeFrangeF_\ast to be almost Ricci soliton and Einstein. We also obtain necessary condition for the vector field β˙\dot{\beta} to be conformal on rangeFrangeF_\ast and necessary and sufficient condition for the vector field β˙\dot{\beta} to be Killing on (rangeF)(rangeF_\ast)^\bot, where β\beta is a geodesic curve on the base space of Clairaut Riemannian map. Also, we obtain necessary condition for the mean curvature vector field of rangeFrangeF_\ast 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 rangeFrangeF_\ast to be minimal and totally geodesic. We also obtain necessary and sufficient condition for Clairaut anti-invariant Riemannian maps to be harmonic.

Keywords

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

R2 v1 2026-06-24T04:47:20.855Z