Finely <IMG >-harmonic functions of a Markov process期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

按检索

Finely -harmonic functions of a Markov process

Authors:	R K Getoor

Institution:	Department of Mathematics, University of California, San Diego, La Jolla, California 92093-0112

Abstract:	Let be a Borel right process and a fixed excessive measure. Given a finely open nearly Borel set we define an operator $\Lambda_G$ which we regard as an extension of the restriction to of the generator of . It maps functions on to (locally) signed measures on not charging -semipolars. Given a locally smooth signed measure $\mu$ we define to be (finely) $\mu$ -harmonic on provided $(\Lambda_G + \mu) h = 0$ on and denote the class of such by $\mathcal H^\mu_f (G)$ . Under mild conditions on we show that $h \in \mathcal H^\mu_f (G)$ is equivalent to a local ``Poisson' representation of . We characterize $\mathcal H^\mu_f (G)$ by an analog of the mean value property under secondary assumptions. We obtain global Poisson type representations and study the Dirichlet problem for elements of $\mathcal H^\mu_f (G)$ under suitable finiteness hypotheses. The results take their nicest form when specialized to Hunt processes.

Keywords:	Markov processes harmonic functions Schr\"odinger operators Poisson representation Dirichlet problem

	点击此处可从《Transactions of the American Mathematical Society》浏览原始摘要信息
	点击此处可从《Transactions of the American Mathematical Society》下载免费的PDF全文