Higher-order derivative of intersection local time for two independent fractional Brownian motions
Abstract
In this article, we obtain sharp conditions for the existence of the high order derivatives (k-th order) of intersection local time α(k)(0) of two independent d-dimensional fractional Brownian motions BH1t and BH2s with Hurst parameters H1 and H2, respectively. We also study their exponential integrability.
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