Steady flows of an incompressible homogeneous chemically reacting fluid are
described by a coupled system, consisting of the generalized Navier--Stokes
equations and convection - diffusion equation with diffusivity dependent on the
concentration and the shear rate. Cauchy stress behaves like power-law fluid
with the exponent depending on the concentration. We prove the existence of a
classical solution for the two dimensional periodic case whenever the power law
exponent is above one and less than infinity
