English

Recent development in biconservative submanifolds

Differential Geometry 2024-01-09 v1

Abstract

A submanifold ϕ:MEm\phi:M\to \mathbb E^{m} is called {\it biharmonic} if it satisfies Δ2ϕ=0\Delta^{2}\phi=0 identically, according to the author. On the other hand, G.-Y. Jiang studied biharmonic maps between Riemannian manifolds as critical points of the bienergy functional, and proved that biharmonic maps φ\varphi are characterized by vanishing of bitension τ2\tau_{2} of φ\varphi. During last three decades there has been a growing interest in the theory of biharmonic submanifolds and biharmonic maps. The study of HH-submanifolds of Em\mathbb E^{m} were derived from biharmonic submanifolds by only requiring the vanishing of the tangential component of Δ2ϕ\Delta^{2}\phi. In 2014, R. Caddeo et. al. named a submanifold MM in any Riemannian manifold ``biconservative'' if the stress-energy tensor S^2\hat S_{2} of bienergy satisfies divS^2=0{\rm div}\, \hat S_{2}=0. Caddeo et. al. also shown that a Euclidean submanifolds is an HH-submanifold if and only if the tangential component of τ2\tau_{2} vanishes and hence the notions of HH-submanifolds and of biconservative submanifolds coincide for Euclidean submanifolds. The first results on biconservative hypersurfaces were proved by T. Hasanis and T. Vlachos, where they called such hypersurfaces {\it H-hypersurfaces} in 1995. Since then biconservative submanifolds has attracted many researchers and a lot of interesting results were obtained. The aim of this article is to provide a comprehensive survey on recent developments on biconservative submanifolds done most during the last decade.

Keywords

Cite

@article{arxiv.2401.03273,
  title  = {Recent development in biconservative submanifolds},
  author = {Bang-Yen Chen},
  journal= {arXiv preprint arXiv:2401.03273},
  year   = {2024}
}

Comments

49 pages

R2 v1 2026-06-28T14:10:15.601Z