摘要
Let Z be the transient reflecting Brownian motion on the closure of an unbounded domain D ⊂ ℝd with N number of Liouville branches. We consider a diffuion X on D having finite lifetime obtained from Z by a time change. We show that X admits only a finite number of possible symmetric conservative diffusion extensions Y beyond its lifetime characterized by possible partitions of the collection of N ends and we identify the family of the extended Dirichlet spaces of all Y (which are independent of time change used) as subspaces of the space BL(D) spanned by the extended Sobolev space He1(D) and the approaching probabilities of Z to the ends of Liouville branches.
| 源语言 | 英语 |
|---|---|
| 页(从-至) | 833-852 |
| 页数 | 20 |
| 期刊 | Journal of the Mathematical Society of Japan |
| 卷 | 70 |
| 期 | 2 |
| DOI | |
| 出版状态 | 已出版 - 2018 |
| 已对外发布 | 是 |