Self-similar martingales derived from Root embedding
Abstract
Given a family of integrable mean-zero probability measures such that, for every , is the image of under the homothety , we provide a necessary and sufficient condition on under which the Root embedding algorithm yields a self-similar martingale with one-dimensional marginals . Precisely, if and denote the Root solution to the Skorokhod embedding problem (SEP) and the Root regular barrier for respectively, then this condition is equivalent to the property that is non-increasing in the sense of inclusion, which in turn is equivalent to the assertion that is non-decreasing a.s. We show that there are many examples for which this result applies and we provide some numerical simulations to illustrate the monotonicity property of regular barriers in this case.
Cite
@article{arxiv.1906.07746,
title = {Self-similar martingales derived from Root embedding},
author = {Antoine-Marie Bogso and Mbehou Mohamed},
journal= {arXiv preprint arXiv:1906.07746},
year = {2019}
}
Comments
13 pages, 2 figures