One-dimensional classical diffusion in a random force field with weakly concentrated absorbers

Abstract

A one-dimensional model of classical diffusion in a random force field with a weak concentration of absorbers is studied. The force field is taken as a Gaussian white noise with φ(x)=0 and φ(x)φ(x')=g δ(x-x'). Our analysis relies on the relation between the Fokker-Planck operator and a quantum Hamiltonian in which absorption leads to breaking of supersymmetry. Using a Lifshits argument, it is shown that the average return probability is a power law P(x,t|x,0)t-2/g (to be compared with the usual Lifshits exponential decay -(2t)1/3 in the absence of the random force field). The localisation properties of the underlying quantum Hamiltonian are discussed as well.