Passage to the limit over a small parameter in the cahn-hilliard equations

1. J. W. Cahn, “On the spinodal decomposition,” Acta Metall.,9, 795–801 (1961).

   Article  Google Scholar 

2. C. M. Elliott and S. Zheng, “On the Cahn-Hilliard equation,” Arch. Rational Mech. Anal.,96, No. 4, 339–357 (1986).

   Article  MATH  MathSciNet  Google Scholar 

3. T. I. Zelenyak, V. A. Novikov, and N. N. Yanenko, “On the properties of solutions to nonlinear equations of variable type,” in: Numerical Methods of Continuum Mechanics [in Russian], Novosibirsk, 1974,5, No. 4, pp. 35–47.

4. C. M. Elliott, “The Stefan problem with a nonmonotone constitutive relation,” IMA J. Appl. Math.,35, No. 2, 257–264 (1985).

   Article  MathSciNet  Google Scholar 

5. M. Slemrod, “Dynamics of measure valued solutions to a backward-forward heat equation,” J. Dynam. Differential Equations,3, No. 1, 1–28 (1991).

   Article  MATH  MathSciNet  Google Scholar 

6. D. Kinderlehrer and P. Pedregal, “Weak convergence of integrands and the Young measure representation,” SIAM J. Math. Anal.,23, No. 1, 1–19 (1992).

   Article  MATH  MathSciNet  Google Scholar 

7. J. M. Ball, “A version of the fundamental theorem for Young measures,” in: PDEs and Continuum Models of Phase Transitions (Nice, 1988), pp. 207–215, Lecture Notes in Phys.,344, Springer, Berlin, Heidelberg, and New York, 1989.

   Chapter  Google Scholar 

8. J. Malek, J. Nečcas, M. Rokyta, and M. Ruzička, Weak and Measure-Valued Solutions to Evolutionary PDEs, Chapman and Hall, London (1996).

   MATH  Google Scholar 

9. H. Federer, Geometric Measure Theory [Russian translation], Nauka, Moscow (1987).

   MATH  Google Scholar 

10. P. Hartman, Ordinary Differential Equations [Russian translation], Mir, Moscow (1970).

    MATH  Google Scholar 

Download references