Global weak solution of 3D-NSE with exponential damping

Abstract

In this paper we prove the global existence of incompressible Navier-Stokes equations with damping α (eβ |u|2-1)u, where we use Friedrich method and some new tools. The delicate problem in the construction of a global solution, is the passage to the limit in exponential nonlinear term. To solve this problem, we use a polynomial approximation of the damping part and a new type of interpolation between L∞(R+,L2(R3)) and the space of functions f such that (eβ|f|2-1)|f|2∈ L1(R3). Fourier analysis and standard techniques are used.