Abstract
This paper considers the problem of constructing finite-dimensional state space realizations for stochastic processes that can be represented as the outputs of a certain type of a causal system driven by a continuous semimartingale input process. The main assumption is that the output process is infinitely differentiable, where the notion of differentiability comes from the functional Itô calculus introduced by Dupire as a causal (nonanticipative) counterpart to Malliavin's stochastic calculus of variations. The proposed approach builds on the ideas of Hijab, who had considered the case of processes driven by a Brownian motion, and makes contact with the realization theory of deterministic systems based on formal power series and Chen-Fliess functional expansions.
| Original language | English (US) |
|---|---|
| Pages (from-to) | 326-331 |
| Number of pages | 6 |
| Journal | IFAC-PapersOnLine |
| Volume | 58 |
| Issue number | 17 |
| DOIs | |
| State | Published - Aug 1 2024 |
| Event | 26th International Symposium on Mathematical Theory of Networks and Systems, MTNS 2024 - Cambridge, United Kingdom Duration: Aug 19 2024 → Aug 23 2024 |
Keywords
- nonlinear control systems
- stochastic realization theory
- Stochastic systems
ASJC Scopus subject areas
- Control and Systems Engineering