Author:
Ren Xiaofeng,Winter Matthias
Abstract
A nonlocal variational problem modelling phase transitions is studied in the framework of Young measures. The existence of global minimisers among functions with internal layers on an infinite tube is proved by combining a weak convergence result for Young measures and the principle of concentration-compactness. The regularity of such global minimisers is discussed, and the nonlocal variational problem is also considered on asymptotic tubes.
Publisher
Cambridge University Press (CUP)
Reference22 articles.
1. Uniqueness of the instanton profile and global stability in nonlocal evolution equations;de Masi;Rend. Math.,1994
2. Single phase energy minimizers for materials with nonlocal spatial dependence
3. Stability of the interface in a model of phase separation
4. 19 Ren X. . Variational approach to multiple layers of the bistable equation in long tubes. Arch. Rational Mech. Anal, (to appear).
5. The Compensated Compactness Method Applied to Systems of Conservation Laws
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