On the Asymptotic Behaviour of some Positive Semigroups

Abstract

Similar to the theory of finite Markov chains it is shown that in a Banach space X ordered by a closed cone K with nonempty interior int(K) a power bounded positive operator A with compact power such that its trajectories for positive vectors eventually flow into int(K), defines a "limit distribution", i.e. its adjoint operator has a unique fixed point in the dual cone. Moreover, the sequence (An) converges with respect to the strong operator topology and for each functional f∈ X' the sequence ((A*)n(f)) converges with respect to the weak*-topology (Theorem 5). If a positive bounded C0-semigroup of linear continuous operators (St)t≥ 0 on a Banach space contains a compact operator and the trajectories of the non-zero vectors x∈ K have the property from above then, in particular, (St) and (S*t) converge to their limit operator with repsect to the operator norm, respectively (Theorem 4). For weakly compact Markov operators in the space of real continuous functions on a compact topological space a corresponding result can be derived, that characterizes the long-term behaviour of regular Markov chains.