A Donsker-type Theorem for Log-likelihood Processes
Abstract
Let (, F, (F)t 0, P) be a complete stochastic basis, X a semimartingale with predictable compensator (B, C, ). Consider a family of probability measures P=( Pn, , ∈ , n 1), where is an index set, Pn, loc P, and denote the likelihood ratio process by Ztn, =dPn, |Ftd P|Ft. Under some regularity conditions in terms of logarithm entropy and Hellinger processes, we prove that Ztn converges weakly to a Gaussian process in ∞() as n→∞ for each fixed t>0.
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