Discretisation error for stochastic integrals with respect to the fractional Brownian motion with discontinuous integrands and local times

Abstract

We consider equidistant Riemann approximations of stochastic integrals ∫0T f(BHs)dBHs with respect to the fractional Brownian motion with H>12, where f is an arbitrary function of locally bounded variation, hence possibly possessing discontinuities. We prove that properly normalised approximation error converge in the L2-topology to a functional of the local time, and we provide rate of convergence for this approximation. As such, our results complements some recent advances on the topic as well as provides new methods for simulation of local times.