Extended states for the Random Schr\"odinger operator on Zd (d≥ 5) with decaying Bernoulli potential

Abstract

In this paper, we investigate the delocalization property of the discrete Schr\"odinger operator Hω=-+vnωnδn,n', where vn= |n|-α and ω=\ωn\n∈Zd∈ \ 1\Zd is a sequence of i.i.d. Bernoulli random variables. Under the assumptions of d≥ 5, α>14 and 0<1, we construct the extended states for a deterministic renormalization of Hω for most ω. This extends the work of Bourgain [ Geometric Aspects of Functional Analysis, LNM 1807: 70--98, 2003], where the case α>13 was handled. Our proof is based on Green's function estimates via a 6th-order renormalization scheme. Among the main new ingredients are the proof of a generalized Khintchine inequality via Bonami's lemma, and the application of the fractional Gagliardo-Nirenberg inequality to control a new type of non-random operators arising from the 6th-order renormalization.