An experimental study was carried out to evaluate epsilon around an oscillating grid producing zero-mean shear flow. The spatial average <(epsilon)over bar> throughout the mixing vessel was determined by the measurement of the net power input of the grid, this complying with a relationship of <(epsilon)over bar>alpha f(D)(3)S(3)Re(-1/2)h(-1), in which f(D) is the driving frequency, S is the stroke length, Re the grid Reynolds number and h the depth of the mixing column. From measurements of the power spectrum using laser Doppler anemometry, spectral collapse of the power spectra in the domain of the energy containing eddies at different distances from the grid was demonstrated using u(2) (u as the turbulence r.m.s. velocity) and tau(E) (Eulerian time integral scale) as the scaling parameters. From a balance of the power input and the energy losses, together with the feature of spectral collapse, it was shown that E could be estimated by epsilon=gamma(1)u(2)/tau(E) in this domain of the power spectrum with gamma(1) as a multiplying coefficient independent of distance from the grid. From the spatial dependence of the turbulence parameters it was evident that within about 1.5 mesh lengths of the grid there was a transition region beyond which it was found that spatial variations were consistent with the dependences u alpha z(-1), tau(E) alpha z(-2), and epsilon alpha z(-4), where z is the distance from the grid.
