Pointwise Decay of Fourier-Stieltjes transform of the Spectral Measure for Jacobi Matrices with Faster-than-Exponential Sparse Perturbations

Abstract

We consider off-diagonal Jacobi matrices J with (faster-than-exponential) sparse perturbations. We prove (Theorem onehalf) that the Fourier transform \| f\| 2d(t) of the spectral measure of J, whose sparse perturbations are at least separated by a distance (cj( j)2) /δ j, for some c>1/2, 0<δ <1 and for a dense subset of C0∞(-2,2)-functions f, decays as t-1/2 (t), uniformly in the spectrum [-2,2], (t) increasing less rapidly than any positive power of t, improving earlier results obtained by Simon (Commun. Math. Phys. 179, 713-722 (1996)) and by Krutikov-Remling (Commun. Math. Phys. 223, 509-532 (2001)) for Schr\"odinger operators with sparse potential that increases as fast as exponential-of-exponential. Applications to the spectrum of the Kronecker sum of two (or more) copies of the model are given.