A Semi Discrete Dynamical System for a 2D Dissipative Quasi Geostrophic Equation
Abstract
A semi-discretization in time, according to a full implicit Euler scheme, for a 2D dissipative quasi geostrophic equation, is studied. We prove existence, uniqueness and regularity results of the solution to the predicted discretization, in the subcritical case for any initial data in L2. Hence, we define an infinite semi-discrete dynamical system, then we prove the existence and the regularity of the corresponding global attractor, for a source term f in Lpα, for a fixed pα = 21-α .
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