Regular subspaces of skew product diffusions

Abstract

Roughly speaking, the regular subspace of a Dirichlet form is also a regular Dirichlet form on the same state space. It inherits the same form of original Dirichlet form but possesses a smaller domain. What we are concerned in this paper are the regular subspaces of associated Dirichlet forms of skew product diffusions. A skew product diffusion X is a symmetric Markov process on the product state space E1× E2 and expressed as \[ Xt=(X1t,X2At), t≥ 0, \] where Xi is a symmetric diffusion on Ei for i=1,2, and A is a positive continuous additive functional of X1. One of our main results indicates that any skew product type regular subspace of X, say \[ Yt=(Y1t,Y2At), t≥ 0, \] can be characterized as follows: the associated smooth measure of A is equal to that of A, and Yi corresponds to a regular subspace of Xi for i=1,2. Furthermore, we shall make some discussions on rotationally invariant diffusions on Rd \0\, which are special skew product diffusions on (0,∞)× Sd-1. Our main purpose is to extend a regular subspace of rotationally invariant diffusion on Rd \0\ to a new regular Dirichlet form on Rd.