Abstract
Two-dimensional steady-state flows of a viscous incompressible fluid over a fixed flat boundary, generated by a periodic near-wall volume force, are studied. The corresponding boundary-value problems for the Navier - Stokes equations are calculated using the expansion of the required solutions in a Fourier series in the longitudinal coordinate and a second-order finite-difference approximation in the vertical coordinate. The dependence of the far flow field on the force parameters is investigated.
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