Hostname: page-component-6d856f89d9-72csx Total loading time: 0 Render date: 2024-07-16T08:45:27.622Z Has data issue: false hasContentIssue false
  • English
  • Français

Directional solidification into static stability

Published online by Cambridge University Press:  26 April 2006

Kirk Brattkus
Kirk Brattkus
Affiliation:
Department of Mathematics, Southern Methodist University, Dallas, TX 75275-0156, USA
Get access Rights & Permissions [Opens in a new window]

Abstract

Consider the directional solidification of a binary alloy rejecting a heavy solute as it solidifies upward. If the solidification front is planar, the fluid melt ahead of the front is stably stratified and convection is not expected. In this paper we analyse the linear stability of planar solidification asymptotically in the limit of large solutal Rayleigh number, R. Three distinct linear modes are found which correspond to internal waves, buoyancy edge waves, or morphological modes. Of these three modes, only the morphological modes are subject to an instability. We find that for large Rayleigh number this instability first occurs at long wavelengths with wavenumbers that scale on R−1/14. The scalings derived from the linear analysis are used to construct a nonlinear theory for the morphological instability in the large Rayleigh number limit. Similarity solutions are found which describe steadily convecting, non-planar growth reminiscent of an observed phenomenon known as steepling.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 304 , 10 December 1995 , pp. 143 - 159
Copyright
© 1995 Cambridge University Press

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

Brattkus, K. 1992 Stimulated convection and morphological instability. In Interactive Dynamics of Convection and Solidification (ed. S. H. Davis, H. E. Huppert, U. Müller & M. G. Worster). NATO ASI Series E, vol. 219, pp. 2325. Kluwer Academic.
Burden, M. H., Hebditch, D. J. & Hunt, J. D. 1973 Macroscopic stability of a planar, cellular or dendritic interface during directional solidification. J. Cryst. Growth 20, 121124.Google Scholar
Coriell, S. R., Cordes, M. R., Boettinger, W. S. & Sekerka, R. F. 1980 Convective and interfacial instabilities during unidirectional solidification of a binary alloy. J. Cryst. Growth 49, 1328.Google Scholar
Coriell, S. R. & Mcfadden, G. B. 1989 Buoyancy effects on morphological instability during directional solidification. J. Cryst. Growth 94, 513521.Google Scholar
Coriell, S. R. & Mcfadden, G. B. 1993 Morphological stability. In Handbook of Crystal Growth 1. Fundamentals Part B: Transport and Stability (ed. D. T. J. Hurle), pp. 785857. North-Holland.
Davis, S. H. 1990 Hydrodynamic interactions in directional solidification. J. Fluid Mech. 212, 241262.Google Scholar
Glicksman, M. E., Coriell, S. R. & Mcfadden, G. B. 1986 Interaction of flows with the crystal-melt interface. Ann. Rev. Fluid Mech. 18, 307335.Google Scholar
Hurle, D. T. J., Jakeman, E. & Wheeler, A. A. 1982 Effect of solutal convection on the morphological stability of a binary alloy. J. Cryst. Growth 58, 163179.Google Scholar
Kevorkian, J. & Cole, J. D. 1981 Perturbation Methods in Applied Mathematics. Springer. LANCER, J. S. 1980 Instabilities and pattern formation in crystal growth. Rev. Mod. Phys. 52, 128.Google Scholar
Merchant, G. J. & Davis, S. H. 1990 Morphological instability in rapid directional solidification. Acta Metall. Mater. 38, 26832693.Google Scholar
Mullins, W. W. & Sekerka, R. F. 1964 Stability of a planar interface during directional solidification of a dilute binary alloy. J. Appl. Phys. 35, 444451.Google Scholar
Riley, D. S. & Davis, S. H. 1990 Long-wave morphological instabilites in the directional solidification of a dilute binary mixture. SI AM J. Appl. Maths 50, 420436.Google Scholar
Scott, M. R. & Watts, H. A. 1977 Computational solution of linear two-point boundary value problems via orthonormalization. SIAM J. Numer. Anal. 14, 4070.Google Scholar
Turner, J. S. 1973 Buoyancy Effects in Fluids. Cambridge University Press.
Verhoeven, J. D., Mason, J. T. & Trivedi, R. 1986 The effect of convection on the dendrite to eutectic transition. Metall. Trans. A 17, 9911000.Google Scholar
Wheeler, A. A., Mcfadden, G. B., Murray, B. T. & Coriell, S. R. 1991 Convective stability in the Rayleigh-Benard and directional solidification problems: high-frequency gravity modulation. Phys. Fluids A 3, 28472858.Google Scholar