Diffusion spiders: Green kernel, excessive functions and optimal stopping

Jukka Lempa, Ernesto Mordecki, Paavo Salminen

Research output: Contribution to journalArticleScientificpeer-review

Abstract

A diffusion spider is a strong Markov process with continuous paths taking values on a graph with one vertex and a finite number of edges (of infinite length). An example is Walsh's Brownian spider where the process on each edge behaves as a Brownian motion. In this paper we calculate firstly the density of the resolvent kernel in terms of the characteristics of the underlying diffusion. Excessive functions are studied via the Martin boundary theory. A crucial result is an expression for the representing measure of a given excessive function. These results are used to solve optimal stopping problems for diffusion spiders.

Original languageEnglish
Article number104229
JournalStochastic Processes and their Applications
Volume167
DOIs
Publication statusPublished - 2024
MoE publication typeA1 Journal article-refereed

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