Ce mémoire traite de la régularité maximale limite dans les espaces de Besov pour le système de Stokes. Les inégalités de régularité maximale limite sont connues dans l'espace et ont joué un rôle dans l'étude du problème de Cauchy. ©Electre 2026

Quatrième de couverture

This memoir is devoted to endpoint maximal regularity in Besov spaces for the evolutionary Stokes system in bounded or exterior domains of Rⁿ. We strive for time independent a priori estimates with L₁ time integrability.

In the whole space case, endpoint maximal regularity estimates are well known and have proved to be spectacularly powerful to investigate the well-posedness issue of PDEs related to fluid mechanics. They have been extended recently by the authors to the half-space setting [15]. The present work deals with the bounded and exterior domain cases. Although in both situations the Stokes system may be localized and reduced up to low order terms to the half-space and whole space cases, the exterior domain case is more involved owing to a bad control on the low frequencies of the solution (no Poincaré inequality is available whatsoever). In order to glean some global-in-time integrability, we adapt to the Besov space setting the approach introduced by P. Maremonti and V.A. Solonnikov in [39]. The price to pay is that we end up with estimates in intersections of Besov spaces, rather than in a single Besov space.

As a first application of our work, we solve locally for large data or globally for small data, the (slightly) inhomogeneous incompressible Navier-Stokes equations in critical Besov spaces, in an exterior domain. After observing that the L₁ time integrability allows to determine globally the streamlines of the flow, the whole system is recast in the Lagrangian coordinates setting. This, in particular, enables us to consider discontinuous densities, as in [17], [19].

The second application concerns a low Mach number system that has been studied recently in the whole space setting by the first author and X. Liao [14].