Fractional Brownian density process and its self-intersection local time of order k

The fractional Brownian density process is a continuous centered Gaussian T'(R-d)-valued process which arises as a high-density fluctuation limit of a Poisson system of independent d-dimensional fractional Brownian motions with Hurst parameter H. (T'(R-d) is the space of tempered distributions). The main result proved in the paper is that if the intensity measure mu of the (initial) Poisson random measure on R-d is either the Lebesgue measure or a finite measure, then the density process has self-intersection local time of order kgreater than or equal to2 if and only if Hd<k/(k-1). The latter is also the necessary and sufficient condition for existence of multiple points of order k for d-dimensional fractional Brownian motion, as proved by Talagrand(12). This result extends to a non-Markovian case the relationship known for (Markovian) symmetric alpha-stable Levy processes and their corresponding density processes. New methods are used in order to overcome the lack of Markov property. Other properties of the fractional Brownian density process are also given, in particular the non-semimartingale property in the case H not equal 1/2, which is obtained by a general criterion for the non-semimartingale property of real Gaussian processes that we also prove.