从马尔可夫过程到半鞅

IF 1.3 Q2 STATISTICS & PROBABILITY
Sebastian Rickelhoff, Alexander Schnurr
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引用次数: 1

摘要

在随机积分和半鞅理论的发展中,马尔可夫过程一直是灵感的源泉。尽管这种历史交织,但对于最初在马尔可夫框架中发展起来的许多概念来说,半鞅应该被认为是“自然的”一类过程。例如,随机微分方程是作为研究马尔可夫过程的工具而发明的,但现在在文献中被单独对待。此外,在最近的半鞅理论出现之前,过程的杀戮已经被人们知道了几十年。我们描述了这些和其他重要的概念在马尔可夫过程理论中被发明的时间,以及它们是如何被转化为半鞅的。进一步的主题包括Blumenthal-Getoor指数的符号、特征和推广。对马尔可夫过程与半鞅之间的关系作了一些补充说明,使本文更加完善。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
From Markov processes to semimartingales
In the development of stochastic integration and the theory of semimartingales, Markov processes have been a constant source of inspiration. Despite this historical interweaving, it turned out that semimartingales should be considered the `natural' class of processes for many concepts first developed in the Markovian framework. As an example, stochastic differential equations have been invented as a tool to study Markov processes but nowadays are treated separately in the literature. Moreover, the killing of processes has been known for decades before it made its way to the theory of semimartingales most recently. We describe, when these and other important concepts have been invented in the theory of Markov processes and how they were transferred to semimartingales. Further topics include the symbol, characteristics and generalizations of Blumenthal-Getoor indices. Some additional comments on relations between Markov processes and semimartingales round out the paper.
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来源期刊
Probability Surveys
Probability Surveys STATISTICS & PROBABILITY-
CiteScore
4.70
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0.00%
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9
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