Vectorial Kato inequality for p-harmonic maps with optimal constant

Abstract

We derive the sharp vectorial Kato inequality for p-harmonic mappings. Surprisingly, the optimal constant differs from the one obtained for scalar valued p-harmonic functions by Chang, Chen, and Wei. As an application we demonstrate how this inequality can be used in the study of regularity of p-harmonic maps. Furthermore, in the case of p-harmonic maps from B3 to S3, we enhance the known range of p values for which regularity is achieved. Specifically, we establish that for p ∈ [2, 2.642], minimizing p-harmonic maps must be regular.

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