English

On Skorohod spaces as universal sample path spaces

Probability 2007-05-23 v1 Optimization and Control

Abstract

The paper presents a factorization theorem for a certain class of stochastic processes. Skorohod spaces carry the rich structure of standard Borel spaces and appear to be suitable universal sample path spaces. We show that, if ξ\xi is a RCLL stochastic process with values in a complete separable metric space EE, any other RCLL stochastic process XX adapted to the filtration induced by ξ\xi factors through the Skorohod space DE[0,)D_E[0,\infty). This can be understood as an extension of a stochastic process to a standard Borel space enjoying nice properties. Moreover, the trajectories of the factorized stochastic process defined on DE[0,)D_E[0,\infty) inherit the properties of being continuous, non-decreasing, and of bounded variation, resp., from those of XX. Considering situations which are invariant under the factorization procedure, the main theorem is a reduction tool to assume the underlying measurable space be a standard Borel space. In an example, we pick the existence theorem of regular conditional probabilities on standard Borel spaces to simplify a conditional expectation appearing in stochastic control problems.

Keywords

Cite

@article{arxiv.math/0412092,
  title  = {On Skorohod spaces as universal sample path spaces},
  author = {Oliver Delzeith},
  journal= {arXiv preprint arXiv:math/0412092},
  year   = {2007}
}

Comments

15 pages; submitted