Shadowing for Infinite Dimensional Dynamical Systems
Abstract
In this paper we extend to an infinite dimensional setting some results on the shadowing property that are known on finite dimensional compact manifolds without border and in Rn. In fact, we show that if \(t):t 0\ is a Morse-Smale semigroup defined in a Hilbert space with a global attractor A and non-wandering set given only by its equilibria, then (1)|A:A A admits the Lipschitz Shadowing property. Moreover, for any positively invariant bounded neighborhood ⊃A of the global attractor, the map (1)|: has the H\"older-Shadowing property. We obtain results related to the structural stability of Morse-Smale semigroups, that were only known on finite dimension and continuity of global attractors.
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