Invariant Measures for Dissipative Dynamical Systems: Abstract Results and Applications

Abstract

In this work we study certain invariant measures that can be associated to the time averaged observation of a broad class of dissipative semigroups via the notion of a generalized Banach limit. Consider an arbitrary complete separable metric space X which is acted on by any continuous semigroup \S(t)\t ≥ 0. Suppose that (t)\t ≥ 0 possesses a global attractor A. We show that, for any generalized Banach limit T → ∞LIM and any distribution of initial conditions m0, that there exists an invariant probability measure m, whose support is contained in A, such that ∫X φ(x) dm (x) = T ∞LIM 1T∫0T ∫X φ(S(t) x) d m0(x) d t, for all observables φ living in a suitable function space of continuous mappings on X. This work is based on a functional analytic framework simplifying and generalizing previous works in this direction. In particular our results rely on the novel use of a general but elementary topological observation, valid in any metric space, which concerns the growth of continuous functions in the neighborhood of compact sets. In the case when \S(t)\t ≥ 0 does not possess a compact absorbing set, this lemma allows us to sidestep the use of weak compactness arguments which require the imposition of cumbersome weak continuity conditions and limits the phase space X to the case of a reflexive Banach space. Two examples of concrete dynamical systems where the semigroup is known to be non-compact are examined in detail.