An asymptotic expansion of the norm of e-|t-s|1\0 s,t T\ in the canonical Hilbert space of fractional Brownian motion
Abstract
Using the inner product formula of the canonical Hilbert space of fractional Brownian motion on an interval [0,T] with Hurst parameter H∈ (0,1) given by Alazemi et al., we show the asymptotic expansion of the norm of fT(s,t):=e-|t-s|1\0 s,t T\ up to the term T4H-4. As applications, we show that the existence of the oblique asymptote of the norm 12\|fT\|2H2 if and only if H∈ (0,12] and that we obtain a sharp upper bound of the difference |12 T \|fT\|H 22-σ2| for H∈ (0,34) which implies two significant estimates concerning to an ergodic fractional Ornstein-Uhlenbeck process, where σ2 is the slope of the oblique asymptote.
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