On the structure of linear semigroups

Dynamical semigroups in \(\mathfrak{B}(\mathscr{H})\) without the norm-continuity assumption are investigated by introducing the notion of form-generator. giving the mathematical expression for the idea of Markovian master equation. It is shown that any formgenerator on \(\mathfrak{B}(\mathscr{H})\)

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

Let n be a Euclidean space and let S be a Euclidean semigroup, i.e., a subsemigroup of the group of isometries of n . We say that a semigroup S acts discontinuously on n if the subset s ∈ S sK ∩ K = is finite for any compact set K of n . The main results of this work are Theorem. If S is a Euclidean