Asymptotical behavior of subspaces under action of asymptotically finite-dimensional semigroups of operators
Abstract
We study a semigroup φ of linear operators acting on a Banach space X which satisfies the condition X0<∞, where X0=\x∈ X φt(x)t∞ 0\. We show that X0 is closed under these conditions. We establish some properties concerning the asymptotic behavior of subspaces which complement X0 in X.
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