Parameter estimation of non-ergodic Ornstein-Uhlenbeck

Abstract

In this paper, we consider the statistical inference of the drift parameter θ of non-ergodic Ornstein-Uhlenbeck~(O-U) process driven by a general Gaussian process (Gt)t 0. When H ∈ (0, 12) ( 12,1) the second order mixed partial derivative of R (t, s) = E [Gt Gs] can be decomposed into two parts, one of which coincides with that of fractional Brownian motion (fBm), and the other of which is bounded by |ts|H-1. This condition covers a large number of common Gaussian processes such as fBm, sub-fractional Brownian motion and bi-fractional Brownian motion. Under this condition, we verify that (Gt)t 0 satisfies the four assumptions in references El2016, that is, noise has H\"older continuous path; the variance of noise is bounded by the power function; the asymptotic variance of the solution XT in the case of ergodic O-U process X exists and strictly positive as T ∞; for fixed s ∈ [0,T), the noise Gs is asymptotically independent of the ergodic solution XT as T ∞, thus ensure the strong consistency and the asymptotic distribution of the estimator θT based on continuous observations of X. Verify that (Gt)t 0 satisfies the assumption in references Es-Sebaiy2019, that is, the variance of the increment process \ ζti-ζti -1, i =1,..., n \ is bounded by the product of a power function and a negative exponential function, which ensure that θn and θn are strong consistent and the sequences Tn ( θn - θ) and Tn ( θn - θ) are tight based on discrete observations of X

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