English

Stopped processes and Doob's optional sampling theorem

Functional Analysis 2020-07-13 v1

Abstract

Using the spectral measure μS\mu_\mathbb{S} of the stopping time S,\mathbb{S}, we define the stopping element XSX_\mathbb{S} as a Daniell integral XtdμS\int X_t\,d\mu_\mathbb{S} for an adapted stochastic process (Xt)tJ(X_t)_{t\in J} that is a Daniell summable vector-valued function. This is an extension of the definition previously given for right-order-continuous sub-martingales with the Doob-Meyer decomposition property. The more general definition of XSX_\mathbb{S} necessitates a new proof of Doob's optional sampling theorem, because the definition given earlier for sub-martingales implicitly used Doob's theorem applied to martingales. We provide such a proof, thus removing the heretofore necessary assumption of the Doob-Meyer decomposition property in the result. Another advancement presented in this paper is our use of unbounded order convergence, which properly characterizes the notion of almost everywhere convergence found in the classical theory. Using order projections in place of the traditional indicator functions, we also generalize the notion of uniformly integrable sequences. In an essential ingredient to our main theorem mentioned above, we prove that uniformly integrable sequences that converge with respect to unbounded order convergence also converge to the same element in L1\mathcal{L}^1.

Keywords

Cite

@article{arxiv.2007.05171,
  title  = {Stopped processes and Doob's optional sampling theorem},
  author = {Jacobus J. Grobler and Christopher M. Schwanke},
  journal= {arXiv preprint arXiv:2007.05171},
  year   = {2020}
}
R2 v1 2026-06-23T17:00:22.188Z