Sample Path Properties of Volterra Processes
Abstract
We consider the regularity of sample paths of Volterra processes. These processes are defined as stochastic integrals M(t)=∫0tF(t,r)dX(r), \ \ t ∈ R+, where X is a semimartingale and F is a deterministic real-valued function. We derive the information on the modulus of continuity for these processes under regularity assumptions on the function F and show that M(t) has "worst" regularity properties at times of jumps of X(t). We apply our results to obtain the optimal H\"older exponent for fractional L\'evy processes.
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