A topological lower bound for the energy of a unit vector field on a closed Euclidean hypersurface

Abstract

For a unit vector field on a closed immersed Euclidean hypersurface M2n+1, n≥ 1, we exhibit a nontrivial lower bound for its energy which depends on the degree of the Gauss map of the immersion. When the hypersurface is the unit sphere S2n+1, immersed with degree one, this lower bound corresponds to a well established value from the literature. We introduce a list of functionals Bk on a compact Riemannian manifold Mm, 1≤ k≤ m, and show that, when the underlying manifold is a closed hypersurface, these functionals possess similar properties regarding the degree of the immersion. In addition, we prove that Hopf flows minimize Bn on S2n+1.