# Trace formulas for general Hermitian matrices: Unitary scattering   approach and periodic orbits on an associated graph

**Authors:** Sven Gnutzmann, Uzy Smilansky

arXiv: 1907.07527 · 2020-01-29

## TL;DR

This paper develops two novel trace formulas for Hermitian matrices by transforming them into unitary matrices, linking spectral properties to combinatorial objects and scattering theory, with potential applications in spectral analysis.

## Contribution

It introduces two new trace formulas for Hermitian matrices using unitary transformations, connecting spectra to Eulerian polynomials and scattering matrices.

## Key findings

- Spectral parameter appears as an argument of Eulerian polynomials.
- Spectral discs relate to Gershgorin's theorem via scattering matrix poles.
- Formulas offer new insights into spectral analysis of Hermitian matrices.

## Abstract

Two trace formulas for the spectra of arbitrary Hermitian matrices are derived by transforming the given Hermitian matrix $H$ to a unitary analogue.   In the first type the unitary matrix is $e^{i(\lambda\II - H)}$ where $\lambda$ is the spectral parameter. The new feature is that the spectral parameter appears in the final form as an argument of Eulerian polynomials -- thus connecting the periodic orbits to combinatorial objects in a novel way. To obtain the second type, one expresses the input in terms of a unitary scattering matrix in a larger Hilbert space.   One of the surprising features here is that the locations and radii of the spectral discs of Gershgorin's theorem appear naturally as the pole parameters of the scattering matrix.   Both formulas are discussed and possible applications are outlined.

## Full text

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## Figures

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## References

36 references — full list in the complete paper: https://tomesphere.com/paper/1907.07527/full.md

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Source: https://tomesphere.com/paper/1907.07527