Lifschitz tail for alloy-type models driven by the fractional Laplacian

Abstract

We establish precise asymptotics near zero of the integrated density of states for the random Schr\"odinger operators (-)α/2 + Vω in L2( Rd) for the full range of α∈(0,2] and a fairly large class of random nonnegative alloy-type potentials Vω. The IDS exhibits the Lifschitz tail singularity. We prove the existence of the limit s 0 sd/α([0,s]) = -C (λd(α))d/α, with C ∈ (0,∞]. The constant C is is finite if and only if the common distribution of the lattice random variables charges \0\. In this case, the constant C is expressed explicitly in terms of such a probability. In the limit formula, λd(α) denotes the Dirichlet ground-state eigenvalue of the operator (-)α/2 in the unit ball in Rd.