Harnack inequalities for nonlocal operators with supercritical drifts and their applications

Abstract

In this paper, we investigate Harnack estimates for weak solutions to the following nonlocal equation: ∂t u = α/2 u + b · ∇ u + f, where α/2 denotes the fractional Laplacian, b is a divergence-free vector field in a critical or supercritical regularity regime, and f is a distribution in a fractional Sobolev space with negative indices. As applications of the analytical results obtained in this paper, we establish the well-posedness of critical stochastic quasi-geostrophic equations driven by additive Brownian noise, prove the existence of weak solutions to the two-dimensional fractional Navier--Stokes equations with measure-valued initial vorticity, and demonstrate the well-posedness of generalized martingale problems associated with critical stochastic differential equations.

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