On quasi-contractivity ofC0-semigroups on 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

In this note, the exponential stability for C semigroups in a Hilbert space is 0 considered. First, an expression for a C semigroup is given, and then a formula on 0 the growth order of a C semigroup is obtained. Finally, with some additional 0 condition such as the boundedness of the resolvent of t

Given a family (e tAk ) t 0 (k # N) of commuting contraction semigroups, we investigate when the infinite product > k=1 e tAk converges and defines a C 0 -semigroup. A particular case is the heat semigroup in infinite dimension introduced by Cannarsa and Da Prato (J. Funct. Anal. 118 (1993), 22 42).