A non-autonomous scalar one-dimensional dissipative parabolic problem: The description of the dynamics

Abstract

The purpose of this paper is to give a characterization of the structure of non-autonomous attractors of the problem ut= uxx + λ u - β(t)u3 when the parameter λ > 0 varies. Also, we answer a question proposed in [11], concerning the complete description of the structure of the pullback attractor of the problem when 1<λ <4 and, more generally, for λ ≠ N2, 2 ≤ N ∈ N. We construct global bounded solutions , "non-autonomous equilibria", connections between the trivial solution these "non-autonomous equilibria" and characterize the α-limit and ω-limit set of global bounded solutions. As a consequence, we show that the global attractor of the associated skew-product flow has a gradient structure. The structure of the related pullback an uniform attractors are derived from that.