The identification of diffusions from imperfect observations
Abstract
This paper studies the identification of an Rd-valued diffusion X when a running function of it, say h(Xt), is observed. A point-wise observation of the process (in other words, observing h(Xt) in isolation) cannot identify Xt unless the h is injective. However observing h(Xs) on a small interval [t,t+] can be enough to determine Xt exactly. The paper contain results that expand on this idea; in particular, a property of `fine total asymmetry' of twice continuously differentiable h is introduced that depends on the fine topology of potential theory and that is both necessary and sufficient for X to be adapted to a natural right-continuous filtration generated by the observations. This particular filtration, though augmented with null sets, does not depend on the distribution of X0. For real-analytic h the property reduces to simple asymmetry; that is, there is no nontrivial affine isometry on Rd such that h = h . A second result concerns the case where X0 is given and h is merely Borel; then X is adapted to an augmented filtration generated by the observation process (h(Xt))t≥ 0 if h is `locally invertible' on a subset of Rd dense in the fine topology on Rd.
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