| Popis: |
In 1934, Leray proved the existence of global-in-time weak solutions to the Navier-Stokes equations for any divergence-free initial data in $L^2$. In the 1980s, Giga and Kato independently showed that there exist global-in-time mild solutions corresponding to small enough critical $L^3(\mathbb{R}^3)$ initial data. In 1990, Calder\'on filled the gap to show that there exist global-in-time weak solutions for all supercritical initial data in $L^p$ for $2< p<3$ by utilising a splitting argument, blending the constructions of Leray and Giga-Kato. In this paper, we utilise a "Calder\'on-like" splitting to show the global-in-time existence of weak solutions to the Navier-Stokes equations corresponding to supercritical Besov space initial data $u_0 \in \dot{B}^{s}_{q,\infty}$ where $q>2$ and $-1+\frac{2}{q}Comment: 28 pages, 3 embedded figures |
