English

Markov bridges: SDE representation

Probability 2015-11-13 v4

Abstract

Let XX be a Markov process taking values in E\mathbf{E} with continuous paths and transition function (Ps,t)(P_{s,t}). Given a measure μ\mu on (E,E)(\mathbf{E}, \mathscr{E}), a Markov bridge starting at (s,εx)(s,\varepsilon_x) and ending at (T,μ)(T^*,\mu) for T<T^* <\infty has the law of the original process starting at xx at time ss and conditioned to have law μ\mu at time TT^*. We will consider two types of conditioning: a) {\em weak conditioning} when μ\mu is absolutely continuous with respect to Ps,t(x,)P_{s,t}(x,\cdot) and b) {\em strong conditioning} when μ=εz\mu=\varepsilon_z for some zEz \in \mathbf{E}. The main result of this paper is the representation of a Markov bridge as a solution to a stochastic differential equation (SDE) driven by a Brownian motion in a diffusion setting. Under mild conditions on the transition density of the underlying diffusion process we establish the existence and uniqueness of weak and strong solutions of this SDE.

Keywords

Cite

@article{arxiv.1402.0822,
  title  = {Markov bridges: SDE representation},
  author = {Umut Çetin and Albina Danilova},
  journal= {arXiv preprint arXiv:1402.0822},
  year   = {2015}
}

Comments

A missing reference is added

R2 v1 2026-06-22T03:01:16.359Z