An Induction Principle for the Weighted p-Energy Minimality of x/|x|

Abstract

In this paper, we investigate minimizing properties of the map x/\|x\| from the Euclidean unit ball Bn to its boundary Sn-1, for the weighted energy functionals En\p,α(u)=∫\Bn \|x\|α\|∇ u\|p dx. We establish the following induction principle: if the map x\|x\|:Bn+1 Sn minimizes En+1\p,α among the maps u: Bn+1 Sn satisfying u(x)=x on Sn, then the map y\|y\|:Bnn-1 minimizes En\p,α+1 among the maps v: Bnn-1 satisfying v(y)=y on Sn-1. This result enables us to enlarge the range of values of p and α for which x/\|x\| minimizes En\p,α.

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