Sharp Transition Between Extinction and Propagation of Reaction
Abstract
We consider the reaction-diffusion equation \[ Tt = Txx + f(T) \] on with T0(x) [-L,L] (x) and f(0)=f(1)=0. In 1964 Kanel' proved that if f is an ignition non-linearity, then T 0 as t∞ when L<L0, and T 1 when L>L1. We answer the open question of relation of L0 and L1 by showing that L0=L1. We also determine the large time limit of T in the critical case L=L0, thus providing the phase portrait for the above PDE with respect to a 1-parameter family of initial data. Analogous results for combustion and bistable non-linearities are proved as well.
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