Spectral analysis of 1D nearest-neighbor random walks and applications to subdiffusive trap and barrier models

Abstract

We consider a family X(n), n ∈ +, of continuous-time nearest-neighbor random walks on the one dimensional lattice Z. We reduce the spectral analysis of the Markov generator of X(n) with Dirichlet conditions outside (0,n) to the analogous problem for a suitable generalized second order differential operator -Dmn Dx, with Dirichlet conditions outside a given interval. If the measures dmn weakly converge to some measure dm*, we prove a limit theorem for the eigenvalues and eigenfunctions of -DmnDx to the corresponding spectral quantities of -Dm* Dx. As second result, we prove the Dirichlet-Neumann bracketing for the operators -Dm Dx and, as a consequence, we establish lower and upper bounds for the asymptotic annealed eigenvalue counting functions in the case that m is a self--similar stochastic process. Finally, we apply the above results to investigate the spectral structure of some classes of subdiffusive random trap and barrier models coming from one-dimensional physics.