Fick's Law in Non-Local Evolution Equations

Abstract

We study the stationary non-local equation which corresponds to the energy functional of a one-dimensional Ising spin system, in which particles interact via a Kac potential. The boundary conditions share the same sign and both lie above the value m*(β)=1-1/β, which divides the metastable region from the unstable one, the inverse temperature being fixed and larger than the critical value βc=1. Due to the non-equilibrium setting, a non zero magnetization current, which scales with the inverse of the size of the volume -1, do flow in the system. Here -1 also represents the ratio of macroscopic and mesoscopic length. We show that for >0 small enough, the stationary profile has no discontinuities so that no phase transition occurs; although expected when the magnetizations are larger than mβ, this turns out to be non trivial at all in the metastable region. Moreover, when -1∞, the solution converges to that of the corresponding macroscopic problem, i.e. the local diffusion equation. The validity of the Fick's law in this context is then established.