No data available.
Please log in to see this content.
You have no subscription access to this content.
No metrics data to plot.
The attempt to load metrics for this article has failed.
The attempt to plot a graph for these metrics has failed.
Behavior of streamwise rib vortices in a three‐dimensional mixing layer
1.R. Kelso, Ph.D. thesis, University of Melbourne, Australia, 1992.
2.S. A. Orszag, “Synergistic interactions between theory and computations in fluid dynamics,” Bull. Am. Phys. Soc. 36, 2635 (1991).
3.Z.-S. She, E. Jackson, and S. A. Orszag, “Intermittent vortex structures in homogeneous isotropic turbulence,” Nature 344, 226 (1990).
4.G. L. Brown and J. M. Lopez, “Axisymmetric vortex breakdown. Part 2. Physical mechanisms,” J. Fluid Mech. 221, 553 (1990).
5.J. H. Chen, M. S. Chong, J. Soria, R. Sondergaard, A. E. Perry, M. Rogers, R. Moser, and B. J. Cantwell, “A study of the topology of dissipating motions in direct numerical simulations of time-developing compressible and incompressible mixing layers,” in Proceedings of the Center for Turbulence Research Summer Program, 1990 (Stanford University/NASA Ames, Stanford, CA, 1990), CTR-390, pp. 139–161.
6.R. Moser and M. Rogers, “The three-dimensional evolution of a plane mixing layer: pairing and transition to turbulence,” J. Fluid Mech. 247, 275 (1993).
7.A. E. Perry and B. D. Fairlie, “Critical points in flow patterns,” Adv. Geophys. 18, 299 (1974).
8.M. S. Chong, A. E. Perry, and B. J. Cantwell, “A general classification of three-dimensional flow fields,” Phys. Fluids A 2, 765 (1990).
9.C. J. Bulbeck, J. M. Lopez, and J. Soria, “A study of the kinematics and topology of unsteady confined swirling flows,” Proceedings of the 11th Australasian Fluid Mechanics Conference (University of Hobart, Tasmania, 1992), pp. 1229–1232.
10.J. M. Lopez, “Axisymmetric vortex breakdown. Part 1. Confined swirling flow,” J. Fluid Mech. 221, 533 (1990).
11.J. M. Lopez and A. D. Perry, “Axisymmetric vortex breakdown. Part 3. Onset of periodic flow and chaotic advection,” J. Fluid Mech. 234, 449 (1992).
12.L. A. Yates and G. T. Chapman, “Streamlines, vorticity lines, and vortices around three-dimensional bodies,” AIAA J. 30, 1819 (1992).
13.E. Dresselhaus and M. Tabor, “The kinematics of stretching and alignment of material elements in general flow fields,” J. Fluid Mech. 236, 415 (1991).
14.L. P. Bernal and A. Roshko, “Streamwise vortex structure in plane mixing layers,” J. Fluid Mech. 170, 499 (1986).
15.G. M. Corcos, “The role of cartoons in turbulence,” Perspectives in Fluid Mechanics, Lecture Notes in Physics, edited by D. E. Coles (Springer-Verlag, New York, 1988), Vol. 320, pp. 48–65.
16.J. Soria, M. S. Chong, R. Sondergaard, A. E. Perry, and B. J. Cantwell, “A study of the fine scale motions of incompressible time-developing mixing layers,” in Proceedings of the Center for Turbulence Research Summer Program, 1992 (Stanford University/NASA Ames, Stanford, CA, 1992), CTR-592, pp. 101–121.
Article metrics loading...
Full text loading...