Department of Mathematical Sciences
Uinversity of Memphis
Memphis, TN 38152, USA
email: cgal@memphis.edu
Ciprian G. Gal
Abstract:
In a previous article [7], we proposed a model of phase separation in a
binary mixture confined to a bounded region which may be contained within
porous walls. The boundary conditions were derived from a mass conservation
law and variational methods. In the present paper, we study the problem
further. Using a Faedo-Galerkin method, we obtain the existence and
uniqueness of a global solution to our problem, under more general
assumptions than those in [7]. We then study its asymptotic behavior and
prove the existence of an exponential attractor (and thus of a global
attractor) with finite dimension.
Submitted August 30, 2006. Published November 16, 2006.
Math Subject Classifications: 35K55, 74N20, 35B40, 35B45, 37L30.
Key Words: Phase separation; Cahn-Hilliard equations;
dynamic boundary conditions; exponential attractors;
global attractors; Laplace-Beltrami differential operators.
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Ciprian G. Gal Department of Mathematical Sciences Uinversity of Memphis Memphis, TN 38152, USA email: cgal@memphis.edu |
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