This paper extends results obtained by Tartar (1977, 1986) and revisited in Briane and G,rard (Ann Scuola Norm Sup Pisa, to appear), on the homogenization of a Stokes equation perturbed by an oscillating drift. First, a N-dimensional scalar equation, for N a parts per thousand yen 3, and a tridimensional Stokes equation are considered in the periodic framework only assuming the L (2)-boundedness of the drift and so relaxing the equi-integrability condition of Briane and G,rard (Ann Scuola Norm Sup Pisa, to appear). Then, it is proved that the L (2)-boundedness can be removed in dimension two, provided that the divergence of the drift has a sign. On the contrary, nonlocal effects are derived in dimension three with a free divergence drift that is only bounded in L (1).