An H1 setting for the Navier-Stokes equations: quantitative estimates

Abstract

We consider the incompressible Navier-Stokes (NS) equations on a torus, in the setting of the spaces L2 and H1; our approach is based on a general framework for semi- or quasi-linear parabolic equations proposed in the previous work [9]. We present some estimates on the linear semigroup generated by the Laplacian and on the quadratic NS nonlinearity; these are fully quantitative, i.e., all the constants appearing therein are given explicitly. As an application we show that, on a three dimensional torus T3, the (mild) solution of the NS Cauchy problem is global for each H1 initial datum u0 with zero mean, such that || curl u0 ||L2 <= 0.407; this improves the bound for global existence || curl u0 ||L2 <= 0.00724, derived recently by Robinson and Sadowski [10]. We announce some future applications, based again on the H1 framework and on the general scheme of [9].