Local Ergodic Theorems for C0-Semigroups
Abstract
Let \T(t)\t≥ 0 be a C0-semigroup of bounded linear operators on the Banach space X into itself and let A be their infinitesimal generator. In this paper, we show that if T(t) is uniformly ergodic, then A does not have the single valued extension property, which implies that A must have a nonempty interior of the point spectrum. Furthermore, we introduce the local mean ergodic for C0-semigroup T(t) at a vector x∈ X and we establish some conditions implying that T(t) is a local mean ergodic at x.
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