Uniqueness of mild solutions to the Navier-Stokes equations in weak-type Ld space

Abstract

This paper deals with the uniqueness of mild solutions to the forced or unforced Navier-Stokes equations in the whole space. It is known that the uniqueness of mild solutions to the unforced Navier-Stokes equations holds in L∞(0,T;Ld(Rd)) when d≥ 4, and in C([0,T];Ld(Rd)) when d≥3. As for the forced Navier-Stokes equations, when d≥3 the uniqueness of mild solutions in C([0,T];Ld,∞(Rd)) with force f and initial data u0 in some proper Lorentz spaces is known. In this paper we show that for d≥3, the uniqueness of mild solutions to the forced Navier-Stokes equations in C((0,T];Ld,∞(Rd)) Lβ(0,T;Ld,∞(Rd)) for β>2d/(d-2) holds when there is a mild solution in C([0,T];Ld,∞(Rd)) with the same initial data and force. Here Ld,∞ is the closure of L∞ Ld,∞ with respect to Ld,∞ norm.