Diffusive limit for a Boltzmann-like equation with non-conserved momentum

Abstract

We consider a kinetic model whose evolution is described by a Boltzmann-like equation for the one-particle phase space distribution f(x,v,t). There are hard-sphere collisions between the particles as well as collisions with randomly fixed scatterers. As a result, this evolution does not conserve momentum but only mass and energy. We prove that the diffusively rescaled f(x,v,t)=f(-1x,v,-2t), as 0 tends to a Maxwellian M, 0, T=(2π T)3/2[-|v|22T], where and T are solutions of coupled diffusion equations and estimate the error in L2x,v.