The existence of an inertial manifold for the modified Leray-$\alpha$ model with periodic boundary conditions in three-dimensional space is proved by using the so-called spatial averaging principle.
Inertial Manifolds for the 3D Cahn-Hilliard Equations with Periodic Boundary Conditions
Inertial manifolds for 1D reaction-diffusion-advection systems. Part II: periodic boundary conditions
Finite dimensionality of 2-D micropolar fluid flow with periodic boundary conditions
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