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Abstract
In this paper, a variant of nonlinear Galerkin method is proposed and analysed for equations of motions arising in a Kelvin–Voigt model of viscoelastic fluids in a bounded spatial domain in Some new a priori bounds are obtained for the exact solution when the forcing function is independent of time or belongs to
in time. As a consequence, existence of a global attractor is shown. For the spectral Galerkin scheme, existence of a unique discrete solution to the semidiscrete scheme is proved and again existence of a discrete global attractor is established. Further, optimal error estimate in
and
-norms are proved. Finally, a modified nonlinear Galerkin method is developed and optimal error bounds are derived. It is, further, shown that error estimates for both schemes are valid uniformly in time under uniqueness condition.
Acknowledgements
The authors acknowledge the financial support provided by the DST-CNPq Indo-Brazil Project No. DST/INT/Brazil/RPO-05/2007 (Grant No. 490795/2007-2). Further, they thank the referees for their valuable comments.