Higher order derivative of self-intersection local time for fractional Brownian motion
Abstract
We consider the existence and H\"older continuity conditions for the k-th order derivatives of self-intersection local time for d-dimensional fractional Brownian motion, where k=(k1,k2,·s, kd). Moreover, we show a limit theorem for the critical case with H=23 and d=1, which was conjectured by Jung and Markowsky (2014).
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