Journal Title
Title of Journal: Math Ann
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Abbravation: Mathematische Annalen
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Publisher
Springer-Verlag
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Authors: Vincent Borrelli Olga GilMedrano
Publish Date: 2006/02/21
Volume: 334, Issue: 4, Pages: 731-751
Abstract
The volume of a unit vector field V of the sphere Open image in new window n odd is the volume of its image V Open image in new window in the unit tangent bundle Unit Hopf vector fields that is unit vector fields that are tangent to the fibre of a Hopf fibration Open image in new window are well known to be critical for the volume functional Moreover Gluck and Ziller proved that these fields achieve the minimum of the volume if n = 3 and they opened the question of whether this result would be true for all odd dimensional spheres It was shown to be inaccurate on spheres of radius one Indeed Pedersen exhibited smooth vector fields on the unit sphere with less volume than Hopf vector fields for a dimension greater than five In this article we consider the situation for any odd dimensional spheres but not necessarily of radius one We show that the stability of the Hopf field actually depends on radius instability occurs precisely if and only if Open image in new window In particular the Hopf field cannot be minimum in this range On the contrary for r small a computation shows that the volume of vector fields built by Pedersen is greater than the volume of the Hopf one thus in this case the Hopf vector field remains a candidate to be a minimizer We then study the asymptotic behaviour of the volume for small r it is ruled by the first term of the Taylor expansion of the volume We call this term the twisting of the vector field The lower this term is the lower the volume of the vector field is for small r It turns out that unit Hopf vector fields are absolute minima of the twisting This fact together with the stability result gives two positive arguments in favour of the Gluck and Ziller conjecture for small r
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