On structure of regular Dirichlet subspaces for one-dimensional Brownian motion

Abstract

The main purpose of this paper is to explore the structure of regular subspaces of 1-dim Brownian motion. As outlined in FMG every such regular subspace can be characterized by a measure-dense set G. When G is open, F=Gc is the boundary of G and, before leaving G, the diffusion associated with the regular subspace is nothing but Brownian motion. Their traces on F still inherit the inclusion relation, in other words, the trace Dirichlet form of regular subspace on F is still a regular subspace of trace Dirichlet form of one-dimensional Brownian motion on F. Moreover we have proved that the trace of Brownian motion on F may be decomposed into two part, one is the trace of the regular subspace on F, which has only the non-local part and the other comes from the orthogonal complement of the regular subspace, which has only the local part. Actually the orthogonal complement of regular subspace corresponds to a time-changed Brownian motion after a darning transform.