Large time behaviour of solutions to the 3D-NSE in Xσ spaces
Abstract
In this paper we study the incompressible Navier-Stokes equations in L2( R3) X-1( R3). In the global existence case, we establish that if the solution u is in the space C( R+,L2 X-1), then for σ>-3/2 the decay of \|u(t)\| Xσ is at least of the order of t-σ+322. Fourier analysis and standard techniques are used.
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