Application of matrix-valued integral continued fractions to spectral problems on periodic graphs

TL;DR

This paper introduces a novel method using matrix-valued integral continued fractions to analyze spectral problems on periodic graphs with defects, providing explicit formulas and applications to graphene.

Contribution

It applies matrix-valued integral continued fractions to spectral problems on periodic lattices with defects, offering explicit resolvent formulas and inverse problem insights.

Findings

Spectral points are characterized as zeroes of determinants of continued fractions.

Explicit resolvent formulas are derived using the continued fractions.

Application to Schrödinger operators on defective graphene demonstrates practical utility.

Abstract

We show that spectral problems for periodic operators on lattices with embedded defects of lower dimensions can be solved with the help of matrix-valued integral continued fractions. While these continued fractions are usual in the approximation theory, they are less known in the context of spectral problems. We show that the spectral points can be expressed as zeroes of determinants of the continued fractions. They are also useful in the study of inverse problems (one-to-one correspondence between spectral data and defects). Finally, the explicit formula for the resolvent in terms of the continued fractions is also provided. We apply some of our results to the Schr\"odinger operator acting on the graphene with line and point defects.