R\^ole de l\'espace de Besov B_(infty)^(-1,infty)dans le contr\^ole de l\'explosion \`eventuelle en temps fini des solutions r\'eguli\`eres des \'equations de Navier-Stokes

Let $u\in C([0,T^{\ast}[;L^{n}(\mathbb{R}% ^{n})^{n})$ be a maximal solution of the Navier-Stokes equations. We prove that $u$ is $C^{\infty}$ on $]0,T^{\ast}[\times \mathbb{R}^{n}$ and there exists a constant $\varepsilon _{\ast}>0$, which depends only on $n,$ such that if $T^{\ast}$ is finite then, for all $\omega \in S(\mathbb{R}% ^{n})^{n},$ we have $\overline{\lim_{t\to T^{\ast}}}\Vert u(t)-\omega \Vert_{\mathbf{B}_{\infty}^{-1,\infty}}\geq \varepsilon_{\ast}.$