Smoothness of Flow and Path-by-Path Uniqueness in Stochastic Differential Equations

Abstract

We consider the stochastic differential equation Xt = x0 + ∫0t f(Xs)ds + ∫0tσ(Xs)dBHs, with x0 ∈ Rd, d ≥ 1, f: Rd → Rd is bounded continuous, σ: Rd → Rd× d is a uniformly elliptic, bounded, twice continuously differentiable conservative vector field and BH is fractional Brownian motion with H ∈ (13, 12]. When d=1, H= 12, and f is H\"older continuous, in the spirit of Davie [D07], we establish the existence of a null set N depending only on f, σ such that for all x0∈ R and ω ∈ N, the above equation admits a path-by-path unique solution. Our proof is based on establishing the uniform continuous differentiability of the flow associated with the equation. We also establish the path-by-path uniqueness for d ≥ 1 and H ∈ (13, 12], but the null set may depend on x0, thus extending a result of Catellier-Gubinelli [CG12].