From minimal embeddings to minimal diffusions
Probability
2014-02-14 v2
Abstract
There is a natural connection between the class of diffusions, and a certain class of solutions to the Skorokhod Embedding Problem (SEP). We show that the important concept of minimality in the SEP leads to the new and useful concept of a minimal diffusion. Minimality is closely related to the martingale property. A diffusion is minimal if it minimises the expected local time at every point among all diffusions with a given distribution at an exponential time. Our approach makes explicit the connection between the boundary behaviour, the martingale property and the local time characteristics of time-homogeneous diffusions.
Keywords
Cite
@article{arxiv.1306.2873,
title = {From minimal embeddings to minimal diffusions},
author = {Alexander M. G. Cox and Martin Klimmek},
journal= {arXiv preprint arXiv:1306.2873},
year = {2014}
}