Local times of self-intersection and sample path properties of Volterra Gaussian processes
Abstract
We study a Volterra Gaussian process of the form X(t)=∫t0K(t,s)dW(s), where W is a Wiener process and K is a continuous kernel. In dimension one, we prove a law of the iterated logarithm, discuss the existence of local times and verify a continuous dependence between the local time and the kernel that generates the process. Furthermore, we prove the existence of the Rosen renormalized self-intersection local times for a planar Gaussian Volterra process.
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