Vector field cycles in the tangent bundle
Abstract
Given a closed Riemannian manifold and a vector field on , we form the Sasaki metric on , and restrict it to the image of the cross section map of into defined by , whose pull back to defines a new metric on . We then view the cross section as an isometric embedding , which when , ranges into the unit sphere bundle . is minimal or minimal unit if these embeddings have null mean curvature vectors, conditions that occur if, is in the kernel or is an eigenvector, respectively, of a first order perturbation of a weighted rough Laplacian, the weights and perturbation determined by the covariant derivatives along unit directions in suitable normal frames that include when , and curvature tensor of . A minimal unit field must be Killing, and other than parallel fields, is the only minimal one. We characterize the minimal unit vector fields on the standard sphere as those defining contact strictly pseudoconvex CR structures whose Levi form and sign are determined by and the orientation. If and are the total exterior scalar curvature and squared norm of the mean curvature vector functionals, and , a canonical cycle is a critical point of the functional under conformal deformations, notion conveniently defined also when . The zero section of is a canonical cycle if, and only if, the scalar curvature of is constant. We describe some examples of these vector fields and cycles, and analyze their deformations under dilations of the field.
Keywords
Cite
@article{arxiv.2508.17441,
title = {Vector field cycles in the tangent bundle},
author = {Santiago R. Simanca},
journal= {arXiv preprint arXiv:2508.17441},
year = {2025}
}