Effect of boundaries on the spectrum of a one-dimensional random mass Dirac Hamiltonian

Abstract

The average density of states (DoS) of the one-dimensional Dirac Hamiltonian with a random mass on a finite interval [0,L] is derived. Our method relies on the eigenvalues distributions (extreme value statistics problem) which are explicitly obtained. The well-known Dyson singularity <rho(epsilon;L)>-L/|epsilon|ln3|ε| is recovered above the crossover energy epsilonc exp-sqrtL. Below epsilonc we find a log-normal suppression of the average DoS <rho(epsilon;L)> 1/(|epsilon|sqrt(L))exp(-(ln2|epsilon|)/L).