Relatively Uniformly Continuous Semigroups on Vector Lattices

Abstract

In this paper we study continuous semigroups of positive operators on general vector lattices equipped with the relative uniform topology τru. We introduce the notions of strong continuity with respect to τru and relative uniform continuity for semigroups. These notions allow us to study semigroups on non-locally convex spaces such as Lp(R) for 0<p<1 and non-complete spaces such as Lip(R), UC(R), and Cc(R). We show that the (left) translation semigroup on the real line, the heat semigroup and some Koopman semigroups are relatively uniformly continuous on a variety of spaces.