# Density of the spectrum of Jacobi matrices with power asymptotics

**Authors:** Raphael Pruckner

arXiv: 1704.06789 · 2018-09-28

## TL;DR

This paper analyzes the spectral density of Jacobi matrices with parameters following specific power asymptotics, establishing conditions for the limit circle case and calculating the spectrum's convergence exponent.

## Contribution

It provides new criteria for the limit circle case and determines the spectral convergence exponent for Jacobi matrices with power asymptotic parameters.

## Key findings

- Spectral convergence exponent is 1/β₁ under certain conditions.
- Bounds for the upper density of the spectrum are established.
- Complete characterization of the limit circle case with additional asymptotic terms.

## Abstract

We consider Jacobi matrices $J$ whose parameters have the power asymptotics $\rho_n=n^{\beta_1} \left( x_0 + \frac{x_1}{n} + {\rm O}(n^{-1-\epsilon})\right)$ and $q_n=n^{\beta_2} \left( y_0 + \frac{y_1}{n} + {\rm O}(n^{-1-\epsilon})\right)$ for the off-diagonal and diagonal, respectively. We show that for $\beta_1 > \beta_2$, or $\beta_1=\beta_2$ and $2x_0 > |y_0|$, the matrix $J$ is in the limit circle case and the convergence exponent of its spectrum is $1/\beta_1$. 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 $\lim_{n\to \infty} |q_n|\big/ \rho_n = 2$) and determine the convergence exponent in almost all cases.

## Full text

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## References

22 references — full list in the complete paper: https://tomesphere.com/paper/1704.06789/full.md

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Source: https://tomesphere.com/paper/1704.06789