We study the long time behavior of solutions of the non-autonomous Reaction-Diffusion equation defined on the entire space R^n when external terms are unbounded in a phase space. The existence of a pullback global attractor for the equation is established in L^2(R^n) and H^1(R^n), respectively. The pullback asymptotic compactness of solutions is proved by using uniform a priori estimates on the tails of solutions outside bounded domains.
Long time behavior of random and nonautonomous Fisher-KPP equations. Part II. Transition fronts
Long time behavior of random and nonautonomous Fisher-KPP equations. Part I. Stability of equilibria and spreading speeds
Long time behavior of solutions of a reaction-diffusion equation on unbounded intervals with Robin boundary conditions
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