Regularity of the free boundary for a parabolic cooperative system

Abstract: In this paper we study the following parabolic system \begin{equation*} \Delta \u -\partial_t \u =|\u|^{q-1}\u\,\chi_{{ |\u|>0 }}, \qquad \u = (u^1, \cdots , u^m) \ , \end{equation*} with free boundary $\partial {|\u | >0}$. For $0\leq q<1$, we prove optimal growth rate for solutions $\u $ 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 $C^{1, \alpha}$ in space directions and half-Lipschitz in the time direction.