Local semigroups of contractions and some applications to Fourier representation theorems

In this paper, a criterion is given for assuring that a linear positive contraction C0-semigrou p defined on an Ll-space is generated by the closure of A + B, A and B being suitable unbounded linear operators. Furthermore, this criterion is applied to the transport equation, Kolmogorov's differentia

This paper is concerned with finiteness conditions for finitely generated semigroups. First, we present a combinatorial result on infinite sequences from which an alternative proof of a theorem of Restivo and Reutenauer follows: a finitely generated semigroup is finite if and only if it is periodic

For a \(C_{14}\)-semigroup \(T(\cdot)\), we prove a general multiplicative perturbation theorem which subsumes many known multiplicative and additive perturbation theorems, and provides a general framework for systematic study of the perturbation associated with a step response \(U(\cdot)\) of a lin