# The spectral symmetry of weakly irreducible nonnegative tensors and   connected hypergraphs

**Authors:** Yi-Zheng Fan, Tao Huang, Yan-Hong Bao, Chen-Lu Zhuan-Sun, Ya-Ping Li

arXiv: 1704.08799 · 2019-02-15

## TL;DR

This paper investigates the spectral symmetry of weakly irreducible nonnegative tensors and connected hypergraphs, characterizing symmetry via group actions, and linking it to hypergraph colorability and structural properties.

## Contribution

It introduces the concept of spectral ll-symmetry for tensors, characterizes it using group theory and generalized traces, and relates it to hypergraph coloring and structure.

## Key findings

- The set  forms an abelian group acting transitively on certain tensor transformations.
- Spectral ll-symmetry is equivalent to ll-colorability for symmetric tensors.
- Existence of hypergraphs with prescribed spectral symmetry for given parameters.

## Abstract

Let $\mathcal{A}$ be a weakly irreducible nonnegative tensor with spectral radius $\rho(\mathcal{A})$. Let $\mathfrak{D}$ (respectively, $\mathfrak{D}^{(0)}$) be the set of normalized diagonal matrices arising from the eigenvectors of $\mathcal{A}$ corresponding to the eigenvalues with modulus $\rho(\mathcal{A})$ (respectively, the eigenvalue $\rho(\mathcal{A})$). It is shown that $\mathfrak{D}$ is an abelian group containing $\mathfrak{D}^{(0)}$ as a subgroup, which acts transitively on the set $\{e^{\mathbf{i} \frac{2 \pi j}{\ell}}\mathcal{A}:j =0,1, \ldots,\ell-1\}$, where $|\mathfrak{D}/\mathfrak{D}^{(0)}|=\ell$ and $\mathfrak{D}^{(0)}$ is the stabilizer of $\mathcal{A}$. The spectral symmetry of $\mathcal{A}$ is characterized by the group $\mathfrak{D}/\mathfrak{D}^{(0)}$, and $\mathcal{A}$ is called spectral $\ell$-symmetric. We obtain the structural information of $\mathcal{A}$ by analyzing the property of $\mathfrak{D}$, especially for connected hypergraphs we get some results on the edge distribution and coloring. If moreover $\mathcal{A}$ is symmetric, we prove that $\mathcal{A}$ is spectral $\ell$-symmetric if and only if it is $(m,\ell)$-colorable. We characterize the spectral $\ell$-symmetry of a tensor by using its generalized traces, and show that for an arbitrarily given integer $m \ge 3$ and each positive integer $\ell$ with $\ell \mid m$, there always exists an $m$-uniform hypergraph $G$ such that $G$ is spectral $\ell$-symmetric.

## Full text

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## References

25 references — full list in the complete paper: https://tomesphere.com/paper/1704.08799/full.md

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Source: https://tomesphere.com/paper/1704.08799