Searching for just a few words should be enough to get started. If you need to make more complex queries, use the tips below to guide you.
Article type: Research Article
Authors: Lods, V.; | Piétrus, A. | Rakotoson, J.M.
Affiliations: Laboratoire d'Applications des Mathématiques, Université de Poitiers, Département de Mathématiques, SP2MI, Téléport 2, boulevard Marie et Pierre CURIE, BP 30179, 86962 Futuroscope cedex, France E‐mail: lods@wallis.sp2mi.univ‐poitiers.fr | Laboratoire d'Analyse, d'Optimisation et de Contrôle, Université des Antilles et de la Guyane, Département de Mathématiques et Informatique, Campus de Fouillole, 97159 Pointe‐a‐Pitre cedex, France
Note: [] Corresponding author.
Abstract: We consider a crystal constituted by an elastic substrate and a film with a small thickness. This crystal being constrained, it appears morphological instabilities. We are interested in the evolution of the free boundary of the film, which is parametrized by a function denoted by f. The three‐dimensional model here considered is detailed in [8]. This model consists in solving a coupled system of partial derivative equations. The first equations are the linearized elasticity equations posed in the solid, the boundary of which depends on the evolution surface. The second equation is the evolution equation, depending on the elastic displacement. This model is first classically simplified in order to obtain a two‐dimensional model by assuming that the crystal is infinite in one dimension. Besides, under some hypotheses, we derive a wide class of models which the unknown is the map of the film–vapor surface and solves a nonlinear partial derivatives equation, which is independent of the displacement of the solid. Some of those models might blow up in finite time as the physicists expect. In this paper, we study the existence and uniqueness of solution of this model, by constructing approximated problems under very weak assumptions. To this end, we assume that the initial map of the free boundary is small enough in an appropriate space.
Keywords: linear elasticity, free boundary problem, fourth order curvature operator, interpolations inequalities
Journal: Asymptotic Analysis, vol. 33, no. 1, pp. 67-91, 2003
IOS Press, Inc.
6751 Tepper Drive
Clifton, VA 20124
USA
Tel: +1 703 830 6300
Fax: +1 703 830 2300
sales@iospress.com
For editorial issues, like the status of your submitted paper or proposals, write to editorial@iospress.nl
IOS Press
Nieuwe Hemweg 6B
1013 BG Amsterdam
The Netherlands
Tel: +31 20 688 3355
Fax: +31 20 687 0091
info@iospress.nl
For editorial issues, permissions, book requests, submissions and proceedings, contact the Amsterdam office info@iospress.nl
Inspirees International (China Office)
Ciyunsi Beili 207(CapitaLand), Bld 1, 7-901
100025, Beijing
China
Free service line: 400 661 8717
Fax: +86 10 8446 7947
china@iospress.cn
For editorial issues, like the status of your submitted paper or proposals, write to editorial@iospress.nl
如果您在出版方面需要帮助或有任何建, 件至: editorial@iospress.nl