Inverse image of precompact sets and existence theorems for the Navier-Stokes equations in spatially periodic setting

Abstract

We consider the initial problem for the Navier-Stokes equations over R3 × [0,T] with a positive time T in the spatially periodic setting. Identifying periodic vector-valued functions on R3 with functions on the 3\,-dimensional torus T3, we prove that the problem induces an open injective mapping A s: Bs1 Bs-12 where Bs1, Bs-12 are elements from scales of specially constructed function spaces of Bochner-Sobolev type parametrized with the smoothness index s ∈ N. Finally, we prove rather expectable statement that a map A s is surjective if and only if the inverse image A s -1(K) of any precompact set K from the range of the map A s is bounded in the Bochner space L s ([0,T], L s ( T3)) with the Ladyzhenskaya-Prodi-Serrin numbers s, r.

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