Data di Pubblicazione:
2013
Abstract:
In the present work, we address a class of Cahn–Hilliard equations
characterized by a singular diffusion term. The problem is a
simplified version with constant mobility of the Cahn–Hilliard–
de Gennes model of phase separation in binary, incompressible,
isothermal mixtures of polymer molecules. It is proved that, for
any final time T , the problem admits a unique energy type
weak solution, defined over (0, T ). For any τ > 0 such solution
is classical in the sense of belonging to a suitable Hölder class
over (τ , T ), and enjoys the property of being separated from the
singular values corresponding to pure phases.
characterized by a singular diffusion term. The problem is a
simplified version with constant mobility of the Cahn–Hilliard–
de Gennes model of phase separation in binary, incompressible,
isothermal mixtures of polymer molecules. It is proved that, for
any final time T , the problem admits a unique energy type
weak solution, defined over (0, T ). For any τ > 0 such solution
is classical in the sense of belonging to a suitable Hölder class
over (τ , T ), and enjoys the property of being separated from the
singular values corresponding to pure phases.
Tipologia CRIS:
1.1 Articolo in rivista
Keywords:
CAHN-HILLIARD EQUATION; well-posedness
Elenco autori:
Schimperna, GIULIO FERNANDO; Pawlow, I.
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