On the Well-Posedness of a Fractional Stokes-Transport System

Abstract

The purpose of this paper is to study the existence, uniqueness and lifespan of solutions for a fractional Stokes-Transport system. This problem should be understood as a model for sedimentation in a fluid where the viscosity law is given by a fractional Lapalce operator (- )α/2, with α = 2 corresponding to the case of a normal viscous fluid, and α = 0 reducing the problem to the Inviscid Incompressible Porous Media equation. For each value of α ∈ [0, d], we prove various results related to well-posedness in critical function spaces, such as the existence of global weak solutions (for α > 0), local existence and uniqueness (for α ≥ 0), global existence and uniqueness (for α ≥ 1), as well as study the lifespan of local solutions (for 0 ≤ α < 1). In particular, we show that gravity stratification leads to a directional blow-up criterion for local solutions (for α ∈ [0, 1[) and find a lower bound for the lifespan of solutions which depends on the value of the dissipation parameter α ∈ [0, 1[.