Some remarks on spectral averaging and the local density of states for random Schr\"odinger operators on $L^2 ( R^d )$

TL;DR

This paper provides new proofs and estimates for spectral properties of random Schrödinger operators, including a Lipschitz continuity result for the local density of states on finite cubes, without requiring localization.

Contribution

It introduces a new proof of spectral averaging using analytic perturbation theory and derives explicit constants for the Wegner estimate, enhancing understanding of spectral behavior in finite-volume random Schrödinger operators.

Findings

Established local trace estimates for spectral projectors.

Provided a new proof of spectral averaging with explicit constants.

Proved Lipschitz continuity of the local density of states at low energies.

Abstract

We prove some local estimates on the trace of spectral projectors for random Schr\"odinger operators restricted to cubes $\Lambda \subset R^d$. We also present a new proof of the spectral averaging result based on analytic perturbation theory. Together, these provide another proof of the Wegner estimate with an explicit form of the constant and an alternate proof of the Birman-Solomyak formula. We also use these results to prove the Lipschitz continuity of the local density of states function for a restricted family of random Schr\"odinger operators on cubes $\Lambda \subset R^d$, for $d \geq 1$. The result holds for low energies without a localization assumption but is not strong enough to extend to the infinite-volume limit.