【 摘 要 】

We consider the spectrally hyperviscous Navier-Stokes equations (SHNSE) which add hyperviscosity to the NSE but only to the higher frequencies past a cutoff wavenumber m(o). In Guermond and Prudhomme (2003) [181, subsequence convergence of SHNSE Galerkin solutions to dissipative solutions of the NSE was achieved in a specific spectral-vanishing-viscosity setting. Our goal is to obtain similar results in a more general setting and to obtain convergence to the stronger class of Leray solutions. In particular we obtain subsequence convergence of SHNSE strong solutions to Leray solutions of the NSE by fixing the hyperviscosity coefficient mu while the spectral hyperviscosity cutoff m(o) goes to infinity. This formulation presents new technical challenges, and we discuss how its motivation can be derived from computational experiments, e.g. those in Borue and Orszag (1996, 1998) [3,4]. We also obtain weak subsequence convergence to Leray weak solutions under the general assumption that the hyperviscous coefficient mu goes to zero with no constraints imposed on the spectral cutoff. In both of our main results the Aubin Compactness Theorem provides the underlying framework for the convergence to Leray solutions. (C) 2013 Elsevier Inc. All rights reserved.

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