Persistence Probability of Fractional Brownian Motion with Random Hurst Exponent

Abstract

We study the persistence properties of a fractional Brownian motion whose Hurst exponent is a random variable instead of a fixed constant. For each fixed H ∈ (0,1), it is well known that the persistence probability of an FBM below a constant barrier decays like T-(1-H)+o(1), as T tends to infinity, cf. Molchan (1999). Our object of interest is the persistence probability of the process resulting from first randomly selecting H∈ (0,1) and then considering a fractional Brownian motion with this value of H as a Hurst exponent, a process that is referred to as a fractional Brownian motion with random exponent. We prove that its persistence probability decays as T-(1-H0)+o(1), as T tends to infinity, where H0 is the essential supremum of the distribution of the random Hurst exponent.

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