A topological lower bound for the energy of a unit vector field on a closed hypersurface of the euclidean space. The 3-dimensional case

Adriana V. Nicoli; Andre O. Gomes; Fabiano G. B. Brito

arxiv: 1609.04900 · v1 · pith:IABGAE46new · submitted 2016-09-16 · 🧮 math.DG

A topological lower bound for the energy of a unit vector field on a closed hypersurface of the euclidean space. The 3-dimensional case

Fabiano G. B. Brito , Andre O. Gomes , Adriana V. Nicoli This is my paper

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keywords boundlowercloseddimensionalenergyeuclideanfunctionalhypersurface

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In this short note we prove that the degree of the Gauss map {\nu} of a closed 3-dimensional hypersurface of the Euclidean space is a lower bound for the total bending functional B, introduced by G. Wiegmink. Consequently, the energy functional E introduced by C. M. Wood admits a topological lower bound.

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A topological lower bound for the energy of a unit vector field on a closed hypersurface of the euclidean space. The 3-dimensional case

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