On the uniform distribution of the Pr\"ufer angles and its implication to a sharp spectral transition of Jacobi matrices with randomly sparse perturbations

Abstract

In the present work we consider off-diagonal Jacobi matrices with uncertainty in the position of sparse perturbations. We prove (Theorem 3.2) that the sequence of Pr\"ufer angles (θkω)k≥ 1 is u.d mod π for all φ ∈ [0,π] with exception of the set of rational numbers and for almost every ω with respect to the product =Πj≥ 1j of uniform measures on -j,...,j. Together with an improved criterion for pure point spectrum (Lemma 4.1), this provides a simple and natural alternative proof of a result of Zlatos (J. Funct. Anal. 207, 216-252 (2004)): the existence of pure point (p.p) spectrum and singular continuous (s.c.) spectra on sets complementary to one another with respect to the essential spectrum [-2,2], outside sets Asc and App, respectively, both of zero Lebesgue measure (Theorem 2.4). Our method allows for an explicit characterization of App, which is seen to be also of dense p.p. type, and thus the spectrum is proved to be exclusively pure point on one subset of the essential spectrum.