Abstract
The microscopic structure of an interface between two compounds arises as a central problem in a wide variety of fields, from electronic devices to corrosion and the stability of alloys. In all these cases, the understanding of the growth processes and related phenomena are of fundamental importance. Moreover, these processes frequently take place far from equilibrium. Such systems are generally described by a macroscopic equation, i.e. a non-linear diffusion equation for the mean concentration.
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References
B. Sapoval, M. Rosso, J.F. Gouyet: J. Phys. (Paris) Lett.46, L149 (1985)
J.D. Gunton, M. Droz: In Lecture Notes in Physics, Vol.183 (Springer,Berlin, Heidelberg 1983).
B. Sapoval, M. Rosso, J.F. Gouyet J.F. Colonna: “Structure fractale d’un front de diffusion” Film, Imagiciel, Paris (1985)
M. Rosso, J.F. Gouyet, B. Sapoval: Phys. Rev.B32, 6053 (1986)
M. Rosso, J.F. Gouyet, B. Sapoval: Phys. Rev.B37, 1832 (1988)
K. Kawasaki: In Phase Transitions and Critical Phenomena, ed. by C. Domb, M.S. Green, Vol.2 (Academic Press,New York 1972)
M. Kolb, J.F. Gouyet, B. Sapoval: Europhys. Lett. 3, 33 (1987)
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© 1988 Springer-Verlag Berlin Heidelberg
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Gobron, T. (1988). Diffusion Fronts of Interacting Particles. In: Jullien, R., Peliti, L., Rammal, R., Boccara, N. (eds) Universalities in Condensed Matter. Springer Proceedings in Physics, vol 32. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-51005-2_19
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DOI: https://doi.org/10.1007/978-3-642-51005-2_19
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-642-51007-6
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