English

On the biharmonicity of vector fields and unit vector fields

Differential Geometry 2021-09-03 v1

Abstract

Let (M,g)(M,g) be a compact Riemannian manifold. Equipping its tangent bundle TMTM (resp. unit tangent bundle T1MT_1M) by a pseudo-Riemannian gg-natural metric GG (resp. G~\tilde{G}), we study the biharmonicty of vector fields (resp. unit vector fields) as maps (M,g)(TM,G)(M,g) \rightarrow (TM,G) (resp. (M,g)(T1M,G~)(M,g) \rightarrow (T_1M,\tilde{G})) as well as critical points of the bienergy functional restricted to the set X(M)\mathfrak{X}(M) (resp. X1(M)\mathfrak{X}^1(M)) of vector fields (resp. unit tangent bundles) on MM. Contrary to the Sasaki metric on TMTM, where the two notions are equivalent to the harmonicity of the vector field and then to its parallelism, we prove that for large classes of gg-natural metrics on TMTM the two notions are not equivalent. Furthermore, we give examples of vector fields which are biharmonic as critical points of the bienergy functional restricted to X(M)\mathfrak{X}(M), but are not biharmonic maps. We provide equally examples of proper biharmonic vector fields (resp. unit vector fields), i.e. those which are biharmonic without being harmonic.

Keywords

Cite

@article{arxiv.2109.00947,
  title  = {On the biharmonicity of vector fields and unit vector fields},
  author = {Mohamed Tahar Kadaoui Abbassi and Souhail Doua},
  journal= {arXiv preprint arXiv:2109.00947},
  year   = {2021}
}

Comments

33 pages

R2 v1 2026-06-24T05:37:45.480Z