Strong (L2,Lγ H01)-continuity in initial data of nonlinear reaction-diffusion equation in any space dimension

Abstract

In this paper, we study the continuity in initial data of a classical reaction-diffusion equation with arbitrary p>2 order nonlinearity and in any space dimension N≥ 1. It is proved that the weak solutions can be (L2, Lγ H01)-continuous in initial data for any γ≥ 2 (independent of the physical parameters of the system), i.e., can converge in the norm of any Lγ H01 as the corresponding initial values converge in L2. Applying this to the global attractor we find that, with external forcing only in L2, the attractor A attracts bounded subsets of L2 in the norm of any Lγ H01, and that every translation set A-z0 of A for any z0 ∈ A is a finite dimensional compact subset of Lγ H01. The main technique we employ is a combination of the mathematical induction and a decomposition of the nonlinearity by which the continuity result is strengthened to (L2, Lγ H01)-continuity and, since interpolation inequalities are avoided, the restriction on space dimension is removed.