We consider a three-dimensional Navier-Stokes-Voigt equations with memory in lacking instantaneous kinematic viscosity, in presence of Ekman type damping and singularly oscillating external forces depending on a positive parameter ε. Under suitable assumptions on the memory term and on the external forces, we prove the existence and the uniform (w.r.t. ε) boundedness as well as the convergence as ε tends to 0 of uniform attractors A ε of a family of processes associated to the model.
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