Hitting probabilities for fractional Brownian motion with deterministic drift
Abstract
Let BH be a d-dimensional fractional Brownian motion with Hurst index H∈(0,1), f:[0,1]d a Borel function, and E⊂[0,1], F⊂Rd are given Borel sets. The focus of this paper is on hitting probabilities of the fractional Brownian motion BH with the deterministic drift f. It aims to highlight the role of the regularity properties of the drift f as well as that of the dimension of E in determining the upper and lower bounds of P\(BH+f)(E) F≠ \ for F a subset of Rd and also for F a singleton.
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