Occasionally attracting compact sets and compact-supercyclicity

Abstract

Let X be a real or complex Banach space and Tt:X X is a power bounded operator (or a C0-semigroup). If there exists a "occasionally" attracting compact subset K (for each x in unit ball n (Tn x, K)=0 then there exists attracting finite-dimensional subspace L (for each x in X n (Tn x, L)=0. Also we define the compact-supercyclicity. Each infinity-dimentional X has no compact-supercyclic isometries. If T is a supercyclic and power bounded that Tnx vanishes for each x$.

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