A weak energy identity for (n+α)-harmonic maps with a free boundary in a sphere

Abstract

In this article, we show that sequences of (n+α)-harmonic maps with a free boundary in Sd-1, where α is a parameter tending to zero, converge to a bubble tree. For such sequences, we prove in detail that the limiting energy is equal to the energy of the macroscopic limit plus the sum of the energies of certain ``bubbles'', each multiplied by a corresponding coefficient.

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