From Exclusion to Slow and Fast Diffusion

Abstract

We construct a nearest-neighbour interacting particle system of exclusion type, which illustrates a transition from slow to fast diffusion. More precisely, the hydrodynamic limit of this microscopic system in the diffusive space-time scaling is the parabolic equation ∂t=∇ (D()∇ ), with diffusion coefficient D()=mm-1 where m∈(0,2] , including therefore the fast diffusion regime in the range m∈(0,1) , and the porous medium equation for m∈(1,2) . The construction of the model is based on the generalized binomial theorem, and interpolates continuously in m the already known microscopic porous medium model with parameter m=2 , the symmetric simple exclusion process with m=1 , going down to a fast diffusion model up to any m>0. The derivation of the hydrodynamic limit for the local density of particles on the one-dimensional torus is achieved via the entropy method -- with additional technical difficulties depending on the regime (slow or fast diffusion) and where new properties of the porous medium model need to be derived.