References 1 Yang, H. and Lees, L., Rayleigh's problem at low Mach number according to the kinetic theory of gases,' J. Math. Phys. 35, 195-235 (1956); also Proceedings of the 1st International Symposium on Rarefied Gasdynamics, edited by F. M. Devienne (Pergamon Press, New York, 1960), pp. 201-238. 2 Gross, E. P. and Jackson, E. A., Kinetic theory of the impulsive motion of an infinite plane, Phys. Fluids 1, 318-328 (1958). 3 Broadwell, J. E., Study of rarefied shear flow by the discrete velocity method, J. Fluid Mech. 19, 401-414 (1964). 4 Cercignani, C. and Sernagiotto, F., Rayleigh's problem at low Mach numbers according to kinetic theory, Proceedings of the 4th International Symposium on Rarefied Gasdynamics, edited by J. H. de Leeuw (Academic Press Inc., New York, 1965), pp. 332-353. 5 Chu, C. K., The high Mach number Rayleigh problem according to the Krook model, Proceedings of the 5th International Symposium on Rarefied Gasdynamics, edited by C. L. Brundin (Academic Press Inc., New York, 1967), pp. 589-605. s Huang, A. B. and Giddens, D. P., The discrete ordinate method for the linearized boundary value problems in kinetic theory of gases, Proceedings of the 5th International Symposium on Rarefied Gasdynamics, edited by C. L. Brundin (Academic .Press Inc., New York, 1967), pp. 481-504. 7 Huang, A. B. and Giddens, D. P., The discrete ordinate method for unsteady linearized Boltzmann-Bhatnagar-GrossKrook equation, Phys. Fluids. 10, 232 (1967). s O'Brien, G, G,? Hyman, M. A,, and Kaplan, S., A study of the numerical solution of partial differential equations, J. Math. Phys. 29, 223-251 (1951). 9 Huang, A. B. and Giddens, D. P., A new table for a modified (half-rang) Gauss-Hermite quadrature with an evaluation of