SELF-SIMILARITY AND UNIQUENESS OF SOLUTIONS FOR SEMILINEAR REACTION-DIFFUSION SYSTEMS

We study the well posedness of the initial-value problem for a coupled semilinear reaction-diffusion system in Marcinkiewicz spaces L((p1,infinity))(Omega) x L((p2,infinity)) (Omega). The exponents p(1), p(2) of the initial-value space are chosen to allow the existence of self-similar solutions (when Omega = R(n)). As a nontrivial consequence of our coupling-term estimates, we prove the uniqueness of solutions in the scaling invariant class C({[}0, infinity); L(p1) (Omega) x L(p2) (Omega)) regardless of their size and sign. We also analyze the asymptotic stability of the solutions, show the existence of a basin of attraction for each self-similar solution and that solutions in L(p1) x L(p2) present a simple long-time behavior. (AU)