Stochastic Currents of Fractional Brownian Motion: Existence and Regularity

Abstract

By using white noise analysis, we study the integral kernel ξ(x), x∈Rd, of stochastic currents corresponding to fractional Brownian motion with Hurst parameter H∈(0,1). For x∈Rd\0\ and d1 we show that the kernel ξ(x) is well-defined as a Hida distribution for all H∈(0,1). For x=0 and d=1, ξ(0) is a Hida distribution for all H∈(0,1). For d2, then ξ(0) is a Hida distribution only for H∈(0,1/d). For d=1, x ≠ 0, and H ∈ (0,1), we show that ξ(x) ∈ G', the space of regular generalized functions. Elements of the space G' and elements from the negative Sobolev--Watanabe distribution spaces share the property that partial sums of their chaos decomposition are square integrable functions. More precisely, we show that ξ(x) ∈ G-s ⊂ G' for x ≠ 0, H ∈ (0,1), and all s > 0.