Cross-variation of Young integral with respect to long-memory fractional Brownian motions
Abstract
We study the asymptotic behaviour of the cross-variation of two-dimensional processes having the form of a Young integral with respect to a fractional Brownian motion of index H 1/ 2. When H is smaller than or equal to 3 / 4, we show asymptotic mixed normality. When H is strictly bigger than 3/4, we obtain a limit that is expressed in terms of the difference of two independent Rosenblatt processes.
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