Density of the spectrum of Jacobi matrices with power asymptotics

Abstract

We consider Jacobi matrices J whose parameters have the power asymptotics n=nβ1 ( x0 + x1n + O(n-1-ε)) and qn=nβ2 ( y0 + y1n + O(n-1-ε)) for the off-diagonal and diagonal, respectively. We show that for β1 > β2, or β1=β2 and 2x0 > |y0|, the matrix J is in the limit circle case and the convergence exponent of its spectrum is 1/β1. Moreover, we obtain upper and lower bounds for the upper density of the spectrum. When the parameters of the matrix J have a power asymptotic with one more term, we characterise the occurrence of the limit circle case completely (including the exceptional case n ∞ |qn|/ n = 2) and determine the convergence exponent in almost all cases.