Dirichlet form approach to diffusions with discontinuous scale

Abstract

It is well known that a regular diffusion on an interval I without killing inside is uniquely determined by a canonical scale function s and a canonical speed measure m. Note that s is a strictly increasing and continuous function and m is a fully supported Radon measure on I. In this paper we will associate a general triple (I,s,m), where s is only assumed to be increasing and m is not necessarily fully supported, to certain Markov processes by way of Dirichlet forms. A straightforward generalization of Dirichlet form associated to regular diffusion will be first put forward, and we will find out its corresponding continuous Markov process X, for which the strong Markov property fails whenever s is not continuous. Then by operating regular representations on Dirichlet form and Ray-Knight compactification on X respectively, the same unique desirable symmetric Hunt process associated to (I,s,m) is eventually obtained. This Hunt process is homeomorphic to a quasidiffusion, which is known as a celebrated generalization of regular diffusion.