The Multiplicative Chaos of H=0 Fractional Brownian Fields

Abstract

We consider a family of fractional Brownian fields \BH\H∈ (0,1) on Rd, where H denotes their Hurst parameter. We first define a rich class of normalizing kernels such that the covariance of XH(x) = (H)12 ( BH(x) - ∫Rd BH(u) (u, x)du), converges to the covariance of a log-correlated Gaussian field when H 0. We then use Berestycki's ``good points'' approach in order to derive the limiting measure of the so-called multiplicative chaos of the fractional Brownian field MHγ(dx) = eγ XH(x) - γ22 E[XH(x)2] dx, as H 0 for all γ ∈ (0,γ*(d)], where γ*(d)>74d. As a corollary we establish the L2 convergence of MHγ over the sets of ``good points'', where the field XH has a typical behaviour. As a by-product of the convergence result, we prove that for log-normal rough volatility models with small Hurst parameter, the volatility process is supported on the sets of ``good points'' with probability close to 1. Moreover, on these sets the volatility converges in L2 to the volatility of multifractal random walks.