Well-posedness of the Deterministic Transport Equation with Singular Velocity Field Perturbed along Fractional Brownian Paths

Abstract

In this article we prove path-by-path uniqueness in the sense of Davie Davie07 and Shaposhnikov Shaposhnikov16 for SDE's driven by a fractional Brownian motion with a Hurst parameter H∈(0,12), uniformly in the initial conditions, where the drift vector field is allowed to be merely bounded and measurable. Using this result, we construct weak unique regular solutions in Wlock,p([0,1]×Rd), p>d of the classical transport and continuity equations with singular velocity fields perturbed along fractional Brownian paths. The latter results provide a systematic way of producing examples of singular velocity fields, which cannot be treated by the regularity theory of DiPerna-Lyons DiPernaLions89, Ambrosio Ambrosio04 or Crippa-De Lellis CrippaDeLellis08. Our approach is based on a priori estimates at the level of flows generated by a sequence of mollified vector fields, converging to the original vector field, and which are uniform with respect to the mollification parameter. In addition, we use a compactness criterion based on Malliavin calculus from DMN92 as well as supremum concentration inequalities. keywords: Transport equation, Compactness criterion, Singular vector fields, Regularization by noise.