R\ole de l\'espace de Besov B∞-1,∞dans le contr\ole de l\'explosion \`eventuelle en temps fini des solutions r\'eguli\`eres des \'equations de Navier-Stokes
Abstract
Let u∈ C([0,T[;Ln(R% n)n) be a maximal solution of the Navier-Stokes equations. We prove that u is C∞ on ]0,T[× Rn and there exists a constant >0, which depends only on n, such that if T is finite then, for all ω ∈ S(R% n)n, we have t T u(t)-ω B∞-1,∞≥ .
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