The stability of an evolving two-dimensional vortex sheet

D. W. Moore

doi:10.1112/S0025579300006124

Abstract

The stability of a two-dimensional vortex sheet against small disturbances in the plane of flow is examined. An integro-differential equation for the disturbances is derived and the possibility of solving it approximately is discussed. The approximation is equivalent to saying that short waves grow in a fashion determined by the local strength of the vortex sheet and it is shown that this need not be true throughout the evolution of the disturbance unless the growth rate is the same everywhere. It is possible for the disturbance on a distant part of the vortex sheet to control what happens locally, if the disturbance on the distant part is growing more rapidly. The approximate theory is applied to the tightly-wound spirals of aerodynamic interest and these are shown to be stable.

References

1.Birkhoff, G.. Proc. Symp. Appl. Math. Am. Math. Soc., 8 (1962).CrossRef Google Scholar

2.Dagan, G.. J. FluidMech., 67 (1975), 113.CrossRef Google Scholar

3.Kirchoff, G.. Mechanik (Leipzig, 1876).Google Scholar

4.Love, A. E.. Proc. Lond. Math. Soc., 25 (1893), 18.CrossRef Google Scholar

5.Moore, D. W. and Griffith-Jones, R.. Mathematika, 21 (1974), 128.Google Scholar

6.Moore, D. W. and Saffman, P. G.. Proc. Roy. Soc., A333 (1973), 491.Google Scholar

7.Muskhelishvili, N. I.. Singular Integral Equations (Moscow, 1946).Google Scholar

8.Rossow, V. J., AIAR, 13, (1975), 476.Google Scholar

2.Saffman, P. G.. Archives of Mechanics, 26 (1974), 423.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Baker, Gregory R 1979. The “cloud in cell” technique applied to the roll up of vortex sheets. Journal of Computational Physics, Vol. 31, Issue. 1, p. 76.

Baker, Gregory R. 1980. A test of the method of Fink & Soh for following vortex-sheet motion. Journal of Fluid Mechanics, Vol. 100, Issue. 01, p. 209.

Leonard, A 1980. Vortex methods for flow simulation. Journal of Computational Physics, Vol. 37, Issue. 3, p. 289.

Moore, D. W. 1981. On the Point Vortex Method. SIAM Journal on Scientific and Statistical Computing, Vol. 2, Issue. 1, p. 65.

Bromilow, I.G. and Clements, R.R. 1982. Some Techniques for Extending the Application of the Discrete Vortex Method of Flow Simulation. Aeronautical Quarterly, Vol. 33, Issue. 1, p. 73.

Meiron, Daniel I. Baker, Gregory R. and Orszag, Steven A. 1982. Analytic structure of vortex sheet dynamics. Part 1. Kelvin–Helmholtz instability. Journal of Fluid Mechanics, Vol. 114, Issue. -1, p. 283.

Blondeaux, P. and De Bernardinis, B. 1983. On the formation of vortex pairs near orifices. Journal of Fluid Mechanics, Vol. 135, Issue. -1, p. 111.

1983. Aerofoil-vortex in a rotational and strained field. Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences, Vol. 390, Issue. 1798, p. 181.

Peace, A. J. 1983. A multi‐vortex model of leading‐edge vortex flows. International Journal for Numerical Methods in Fluids, Vol. 3, Issue. 6, p. 543.

Peyret, Roger and Taylor, Thomas D. 1983. Computational Methods for Fluid Flow. p. 125.

Rizzi, Arthur and Engquist, Björn 1987. Selected topics in the theory and practice of computational fluid dynamics. Journal of Computational Physics, Vol. 72, Issue. 1, p. 1.

Rizzi, Arthur and Purcell, Charles J. 1987. On the computation of transonic leading-edge vortices using the Euler equations. Journal of Fluid Mechanics, Vol. 181, Issue. -1, p. 163.

Krasny, Robert 1988. Vortex Methods. Vol. 1360, Issue. , p. 9.

1988. Nonlinear instability of the wake behind a flat plate placed parallel to a uniform stream. Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences, Vol. 419, Issue. 1856, p. 1.

Rizzi, Arthur and Purcell, Charles J. 1988. Mesh‐refined computation of disordered vortex flow around a cranked delta wing: Transonic speed. Communications in Applied Numerical Methods, Vol. 4, Issue. 2, p. 189.

Rizzi, Arthur and Murman, Earll M. 1988. Computational Fluid Dynamics and Reacting Gas Flows. Vol. 12, Issue. , p. 307.

Agishtein, Michael E. and Migdal, Alexander A. 1989. Dynamics of vortex surfaces in three dimensions: Theory and simulations. Physica D: Nonlinear Phenomena, Vol. 40, Issue. 1, p. 91.

LOWSON, MARTIN 1989. Acoustic forcing of three dimensional shear layers.

Baker, G. R. and Shelley, M. J. 1990. On the connection between thin vortex layers and vortex sheets. Journal of Fluid Mechanics, Vol. 215, Issue. -1, p. 161.

1991. Kolmogorov’s contributions to the physical and geometrical understanding of small-scale turbulence and recent developments. Proceedings of the Royal Society of London. Series A: Mathematical and Physical Sciences, Vol. 434, Issue. 1890, p. 183.

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The stability of an evolving two-dimensional vortex sheet

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