The continuous dependence for the Navier-Stokes equations in Bdp-1p,r

Abstract

In this paper, we mainly investigate the Cauchy problem for the incompressible Navier-Stokes equations in homogeneous Besov spaces Bdp-1p,r with 1≤ p<∞,\ 1≤ r≤ ∞, \ d≥ 2. Firstly, we prove the local existence of the solution and give a lower bound of the lifespan T of the solution. The lifespan depends on the Littlewood-Paley decomposition of the initial data, that is j u0. Secondly, if the initial data un0→ u0 in Bdp-1p,r, then the corresponding lifespan Tn→ T. Thirdly, we prove that the data-to-solutions map is continuous in Bdp-1p,r. Therefore, the Cauchy problem of the Navier-Stokes equations is locally well-posed in the critical Besov spaces in the Hadamard sense. Moreover, we also obtain well-posedness and weak-strong uniqueness results in L∞L2 L2H1.