English

Self-similar martingales derived from Root embedding

Probability 2019-06-20 v1

Abstract

Given a family (μλ,λ0)(\mu_\lambda,\lambda\geq0) of integrable mean-zero probability measures such that, for every λ0\lambda\geq0, μλ\mu_\lambda is the image of μ1\mu_1 under the homothety yλyy\longmapsto\sqrt{\lambda}y, we provide a necessary and sufficient condition on μ1\mu_1 under which the Root embedding algorithm yields a self-similar martingale with one-dimensional marginals (μλ,λ0)(\mu_\lambda,\lambda\geq0). Precisely, if τλ\tau_{\lambda} and RλR_{\lambda} denote the Root solution to the Skorokhod embedding problem (SEP) and the Root regular barrier for μλ\mu_\lambda respectively, then this condition is equivalent to the property that (Rλ,λ0)(R_{\lambda},\lambda\geq0) is non-increasing in the sense of inclusion, which in turn is equivalent to the assertion that (τλ,λ0)(\tau_\lambda,\lambda\geq0) 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 (Rλ,λ0)(R_{\lambda},\lambda\geq0) 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

R2 v1 2026-06-23T09:57:15.935Z