C0-sequentially equicontinuous semigroups: theory and applications

Abstract

We present and apply a theory of one parameter C0-semigroups of linear operators in locally convex spaces. Replacing the notion of equicontinuity considered by the literature with the weaker notion of sequential equicontinuity, we prove the basic results of the classical theory of C0-equicontinuous semigroups: we show that the semigroup is uniquely identified by its generator and we provide a generation theorem in the spirit of the celebrated Hille-Yosida theorem. Then, we particularize the theory in some functional spaces and identify two locally convex topologies that allow to gather under a unified framework various notions C0-semigroup introduced by some authors to deal with Markov transition semigroup. Finally, we apply the results to transition semigroups.