Example of a Dirichlet process whose zero energy part has finite p-variation
Abstract
Let BH be a fractional Brownian motion on R with Hurst parameter H∈(0,1), F be its pathwise antiderivative with F(0)=0, and let B be a standard Brownian motion, independent of BH. We show that the zero energy part At=F(Bt)-∫0t F'(Bs)dBs of F(B) has positive and finite p-variation in a special sense for p0=21+H. We also present some simulation results about the zero energy part of a certain median process which suggest that its 4/3-variation is positive and finite.
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