Proceedings of the Fifth International Conference on Numerical Methods in Fluid Dynamics June 28 – July 2, 1976 Twente University, Enschede pp 241-246 | Cite as
Numerical investigation of viscous effects on trapped oscillations in a rotating fluid
Communications
First Online:
Keywords
Shear Layer Spherical Shell Rossby Number Spectral Equation Ekman Number
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
Preview
Unable to display preview. Download preview PDF.
References
- [1]Aldridge, K.D., 1967. Ph.D. Thesis, M.I.T.Google Scholar
- [2]Bretherton, F.P., 1964. Tellus 16:181–185CrossRefADSGoogle Scholar
- [3]Greenspan, H.P., 1968. The Theory of Rotating Fluids. Cambridge University Press.Google Scholar
- [4]Greenspan, H.P., 1969. Stud. Appl. Math. 48:19–28.MATHGoogle Scholar
- [5]Hide, R. & Stewartson, K., 1972. Rev. Geophys. Space Phys. 10:579–599.ADSCrossRefGoogle Scholar
- [6]Høiland, E., 1962. Geophys. Publ. 24:211–27.Google Scholar
- [7]Israeli, M., 1972. Stud. Appl. Math. 51:219–37.MATHGoogle Scholar
- [8]Israeli, M., 1972. Recent Research on Unsteady Boundary Layers, IUTAM Symp., ed. E. Eichelbrenner.Google Scholar
- [9]Orszag, S.A. & Israeli, M., 1974. Annual Rev. Fluid Mech. 6:281–317.MATHCrossRefADSGoogle Scholar
- [10]Orszag, S.A. & Israeli, M., 1975. Num. Models Ocean Circulation. Nat. Acad. Sci.Google Scholar
- [11]Stern, M.E., 1963. Tellus 15:246–260.CrossRefADSGoogle Scholar
- [12]Stewartson, K. & Rickard, J.A., 1969. J. Fluid Mech. 35:759–773.MATHCrossRefADSGoogle Scholar
- [13]Stewartson, K., 1972. Tellus 23:506–510.ADSCrossRefGoogle Scholar
- [14]Stewartson, K., 1972. Tellus 24:283–287.ADSCrossRefGoogle Scholar
- [15]Stewartson, K., 1972. J. Fluid Mech. 54:749–761.MATHCrossRefADSGoogle Scholar
- [16]Stewartson, K. & Walton, I.C., 1976. Proc. Roy. Soc. A349.Google Scholar
Copyright information
© Springer-Verlag 1976