| speaker: | Jan Sengers University of Maryland |
| time: | Friday, November 16, 14:45 - 15:10 |
We present an analysis of the transverse-velocity fluctuations in an isothermal liquid layer with a uniform shear rate between two parallel horizontal boundaries as a function of the wave number and the Reynolds number. The results have been obtained by solving a stochastic version of the Orr-Sommerfeld equation subject to no-slip boundary conditions in a second-order Galerkin approximation. We find that the spatial Fourier transform of the transverse-velocity fluctuations exhibits a maximum as a function of the wave number q. This maximum is associated with a crossover from a q-4 dependence for larger q to a q2 dependence for small q. The q-4 dependence at larger wave numbers is independent of the boundary conditions, but the small-q behavior is strongly affected by the boundary conditions. The nonequilibrium enhancement of the intensity of the transverse-velocity fluctuations remains finite for all values of the Reynolds number, but increases approximately with the square of the Reynolds number. The relation between our new results and those obtained by previous authors in the absence of boundary conditions is elucidated.
PACS number(s): 05.20Jj, 05.65.+b, 82.70.Dd