Computing interface motion in compressible gas dynamics
暂无分享,去创建一个
[1] L. Evans,et al. Motion of level sets by mean curvature. II , 1992 .
[2] J. Sethian. Numerical algorithms for propagating interfaces: Hamilton-Jacobi equations and conservation laws , 1990 .
[3] S. Osher,et al. Efficient implementation of essentially non-oscillatory shock-capturing schemes,II , 1989 .
[4] P. R. Woodward,et al. Shock-bubble interactions : Generation and evolution of vorticity in two-dimensional supersonic flows , 1988 .
[5] Jay P. Boris,et al. The Gradient Method for Interface Tracking. , 1988 .
[6] G. Tryggvason. Numerical simulations of the Rayleigh-Taylor instability , 1988 .
[7] I. Catton,et al. Three-dimensional Rayleigh-Taylor instability Part 1. Weakly nonlinear theory , 1988, Journal of Fluid Mechanics.
[8] Ivan Catton,et al. Three-dimensional Rayleigh-Taylor instability Part 2. Experiment , 1988, Journal of Fluid Mechanics.
[9] Robert Krasny,et al. Computation of vortex sheet roll-up in the Trefftz plane , 1987, Journal of Fluid Mechanics.
[10] P. Woodward,et al. A Numerical Laboratory , 1987 .
[11] J. Sethian,et al. Fronts propagating with curvature-dependent speed: algorithms based on Hamilton-Jacobi formulations , 1988 .
[12] R. Krasny. Desingularization of periodic vortex sheet roll-up , 1986 .
[13] R. Krasny. A study of singularity formation in a vortex sheet by the point-vortex approximation , 1986, Journal of Fluid Mechanics.
[14] P. Roe. CHARACTERISTIC-BASED SCHEMES FOR THE EULER EQUATIONS , 1986 .
[15] David H. Sharp,et al. Front Tracking Applied to Rayleigh–Taylor Instability , 1986 .
[16] J. Sethian. Curvature and the evolution of fronts , 1985 .
[17] P. Garabedian. A remark about pointed bubbles , 1985 .
[18] F. Wubs. Notes on numerical fluid mechanics , 1985 .
[19] D. Youngs,et al. Numerical simulation of turbulent mixing by Rayleigh-Taylor instability , 1984 .
[20] K. I. Read,et al. Experimental investigation of turbulent mixing by Rayleigh-Taylor instability , 1984 .
[21] Steven A. Orszag,et al. Boundary integral methods for axisymmetric and three-dimensional Rayleigh-Taylor instability problems , 1984 .
[22] Norman J. Zabusky,et al. Regularization of contour dynamical algorithms. I. tangential regularization , 1983 .
[23] Steven A. Orszag,et al. Generalized vortex methods for free-surface flow problems , 1982, Journal of Fluid Mechanics.
[24] D. I. Pullin,et al. Numerical studies of surface-tension effects in nonlinear Kelvin–Helmholtz and Rayleigh–Taylor instability , 1982, Journal of Fluid Mechanics.
[25] S. Osher,et al. Upwind difference schemes for hyperbolic systems of conservation laws , 1982 .
[26] E. Krause. Eighth international conference on numerical methods in fluid dynamics , 1982 .
[27] D. W. Moore. On the Point Vortex Method , 1981 .
[28] Climbing water films in experiments on Rayleigh–Taylor instabilities , 1980 .
[29] Steven A. Orszag,et al. Vortex simulations of the Rayleigh–Taylor instability , 1980 .
[30] B. Chakraborty. Rayleigh–Taylor instability in the presence of an oscillating magnetic field permeating both heavier and lighter fluids , 1980 .
[31] D. Hsieh. Nonlinear Rayleigh–Taylor stability with mass and heat transfer , 1979 .
[32] R. C. Mjolsness,et al. Initial value problem for Rayleigh–Taylor instability of viscous fluids , 1978 .
[33] J. Thomson,et al. Numerical studies of some nonlinear hydrodynamic problems by discrete vortex element methods , 1978, Journal of Fluid Mechanics.
[34] David H. Sharp,et al. Unstable normal mode for Rayleigh–Taylor instability in viscous fluids , 1977 .
[35] S. L. Thompson,et al. Rayleigh-Taylor instabilities in inertial-confinement fusion targets , 1977 .
[36] J. Krolik. Rayleigh-Taylor modes in constant-density incompressible fluids accelerated by radiation pressure. [astrophysical models , 1977 .
[37] Alexandre J. Chorin,et al. Discretization of a vortex sheet, with an example of roll-up☆ , 1973 .
[38] R. S. Tankin,et al. Experimental study of Taylor instability , 1973 .
[39] M. Ratafia. Experimental investigation of Rayleigh‐Taylor instability , 1973 .
[40] A. Chorin. Numerical study of slightly viscous flow , 1973, Journal of Fluid Mechanics.
[41] K. Meyer,et al. Numerical Investigation of the Stability of a Shock‐Accelerated Interface between Two Fluids , 1972 .
[42] C. W. Hirt,et al. A lagrangian method for calculating the dynamics of an incompressible fluid with free surface , 1970 .
[43] Bart J. Daly,et al. Numerical Study of the Effect of Surface Tension on Interface Instability , 1969 .
[44] B. J. Daly. Numerical Study of Two Fluid Rayleigh‐Taylor Instability , 1967 .
[45] M. Plesset,et al. General Analysis of the Stability of Superposed Fluids , 1964 .
[46] Rayleigh‐Taylor Instability for Compressible Fluids , 1964 .
[47] I. A. Charnyi,et al. Two-Dimensional Supersonic Flow , 1961 .
[48] S. Chandrasekhar. Hydrodynamic and Hydromagnetic Stability , 1961 .
[49] R. D. Richtmyer. Taylor instability in shock acceleration of compressible fluids , 1960 .
[50] H. W. Emmons,et al. Taylor instability of finite surface waves , 1960, Journal of Fluid Mechanics.
[51] Richard Bellman,et al. Effects of Surface Tension and Viscosity on Taylor Instability , 1954 .
[52] On two-dimensional supersonic flows , 1949 .