Adjoints of Semigroups of Linear Operators in Banach Spaces

Let (X, • ) be a Banach space. We study asymptotically bounded quasi constricted representations of an abelian semigroup IP in L(X), i. e. representations (Tt) t∈IP which satisfy the following conditions: i) lim t→∞ Ttx < ∞ for all x ∈ X. ii) X 0 := {x ∈ X : lim t→∞ Ttx = 0} is closed and has finite

We show that any series Ý K of operators in L X, Y that is unconditionally n n convergent in the weak operator topology and satisfies the condition that Ý K n g F n is a compact operator for every index set F : ‫ގ‬ is unconditionally convergent in the uniform operator topology if and only if X \*, t

Feedback stabilizability is studied for linear retarded systems in Banach spaces. Under the assumptions that the control is finite dimensional and the corresponding instantaneous free system generates a compact semigroup, the rank condition for exponential stabilizability is established based on the