Regularity of the free boundary for a parabolic cooperative system

Abstract

In this paper we study the following parabolic system equation* -∂t =||q-1\,\ ||>0 \, = (u1, ·s , um) \ , equation* with free boundary ∂ \| | >0\. For 0≤ q<1, we prove optimal growth rate for solutions to the above system near free boundary points, and show that in a uniform neighbourhood of any a priori well-behaved free boundary point the free boundary is C1, α in space directions and half-Lipschitz in the time direction.

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