Higher Regularity of the Free Boundary in a Semilinear System

Abstract

In this paper we are concerned with higher regularity properties of the elliptic system \[ u= |u|q-1u\|u|>0\,u=(u1,…,um) \] for 0≤ q<1. We show analyticity of the regular part of the free boundary ∂\|u|>0\, analyticity of |u|1-q2 and u|u| up to the regular part of the free boundary. Applying a variant of the partial hodograph-Legendre transformation and the implicit function theorem, we arrive at a degenerate equation, which introduces substantial challenges to be dealt with. Along the lines of our study, we also establish a Cauchy-Kowalevski type statement to show the local existence of solution when the free boundary and the restriction of u|u| from both sides to the free boundary are given as analytic data.

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