# H\"older Continuity of the Spectra for Aperiodic Hamiltonians

**Authors:** Siegfried Beckus, Jean Bellissard, Horia Cornean

arXiv: 1901.07789 · 2020-01-08

## TL;DR

This paper proves that the spectrum of a class of aperiodic Hamiltonians varies in a H"older continuous manner with respect to the underlying configuration, establishing a quantitative stability result.

## Contribution

It establishes H"older (even Lipschitz) continuity of the spectral map for strongly pattern equivariant Hamiltonians on colored lattices.

## Key findings

- Spectral location depends continuously on configurations.
- Spectral distance is bounded by the dynamical systems' distance.
- The result applies to a broad class of aperiodic Hamiltonians.

## Abstract

We study the spectral location of strongly pattern equivariant Hamiltonians arising through configurations on a colored lattice. Roughly speaking, two configurations are "close to each other" if, up to a translation, they "almost coincide" on a large fixed ball. The larger this ball is, the more similar they are, and this induces a metric on the space of the corresponding dynamical systems. Our main result states that the map which sends a given configuration into the spectrum of its associated Hamiltonian, is H\"older (even Lipschitz) continuous in the usual Hausdorff metric. Specifically, the spectral distance of two Hamiltonians is estimated by the distance of the corresponding dynamical systems.

## Full text

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## References

48 references — full list in the complete paper: https://tomesphere.com/paper/1901.07789/full.md

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Source: https://tomesphere.com/paper/1901.07789