Surface Tension and -Convergence of Van der Waals-Cahn-Hilliard Phase Transitions in Stationary Ergodic Media
Abstract
We study the large scale equilibrium behavior of Van der Waals-Cahn-Hilliard phase transitions in stationary ergodic media. Specifically, we are interested in free energy functionals of the following form equation* Fω(u) = ∫Rd (12 ω(x,Du(x))2 + W(u(x)) ) \, dx, equation* where W is a double-well potential and ω(x,·) is a stationary ergodic Finsler metric. We show that, at large scales, the random energy Fω can be approximated by the anisotropic perimeter associated with a deterministic Finsler norm . To find , we build on existing work of Alberti, Bellettini, and Presutti, showing, in particular, that there is a natural sub-additive quantity in this context.
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