Abstract
In this paper, we establish a novel approach to proving existence of non-negative weak solutions for degenerate parabolic equations of fourth order, like the Cahn-Hilliard and certain thin film equations. The considered evolution equations are in the form of a gradient flow for a perturbed Dirichlet energy with respect to a Wasserstein-like transport metric, and weak solutions are obtained as curves of maximal slope. Our main assumption is that the mobility of the particles is a concave function of their spatial density. A qualitative difference of our approach to previous ones is that essential properties of the solution - non-negativity, conservation of the total mass and dissipation of the energy - are automatically guaranteed by the construction from minimizing movements in the energy landscape.
Original language | English |
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Pages (from-to) | 814-850 |
Number of pages | 37 |
Journal | Journal of Differential Equations |
Volume | 253 |
Issue number | 2 |
DOIs | |
State | Published - 15 Jul 2012 |
Keywords
- Cahn-Hilliard equation
- Fourth order parabolic equation
- Metric gradient flow
- Thin film equation
- Wasserstein metric