Inertial manifolds for the two-dimensional hyperviscous Navier-Stokes equations

Abstract

This study establishes the existence of inertial manifolds for the hyperviscous Navier-Stokes equations (HNSE) on a 2D periodic domain: equation* ∂t u+ (-) βu+(u· ∇ )u+∇ p=f, \;\; on \;\; T2, equation* with ∇ · u=0, for any β > 1712 . The exponent β = 32 is identified as the "critical" value for the inertial manifold problem in 2D HNSE, below which the spectral gap condition is not satisfied. A breakthrough in this work is that it extends the theory to "supercritical" regimes where β < 32. An important aspect of our argument involves a refined analysis on the sparse distribution of lattice points in annular regions.