Publication Date:
2018
abstract:
In this paper we discuss a family of viscous Cahn{Hilliard equations with a non-smooth viscosity term. This system may be viewed as an approximation of a "forward-backward" parabolic equation. The resulting problem is highly nonlinear, coupling in the same equation two nonlinearities with the diffusion term. In particular, we prove existence of solutions for the related initial and boundary value problem. Under suitable assumptions, we also state uniqueness and continuous dependence on data.
Iris type:
01.01 Articolo in rivista
Keywords:
Cahn-Hilliard equations; Continuous dependence; Diffusion of species; Existence of solutions; Initial-boundary value problem; Non-smooth regularization; Nonlinearities; Viscosity
List of contributors:
Bonetti, Elena; Colli, Pierluigi
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