Interlacing families and the Hermitian spectral norm of digraphs
It is proved that for any finite connected graph $G$, there exists an orientation of $G$ such that the spectral radius of the corresponding Hermitian adjacency matrix is smaller or equal to the spectral radius of the universal cover of $G$ (with equality if and only if $G$ is a tree). This resolv...
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sg-ntu-dr.10356-1466762023-02-28T19:59:30Z Interlacing families and the Hermitian spectral norm of digraphs Greaves, Gary Royden Watson Mohar, Bojan O, Suil School of Physical and Mathematical Sciences Science::Mathematics Hermitian Adjacency Matrix Digraph It is proved that for any finite connected graph $G$, there exists an orientation of $G$ such that the spectral radius of the corresponding Hermitian adjacency matrix is smaller or equal to the spectral radius of the universal cover of $G$ (with equality if and only if $G$ is a tree). This resolves a problem proposed by Mohar. The proof uses the method of interlacing families of polynomials that was developed by Marcus, Spielman, and Srivastava in their seminal work on the existence of infinite families of Ramanujan graphs. Accepted version 2021-03-04T08:22:30Z 2021-03-04T08:22:30Z 2018 Journal Article Greaves, G. R. W., Mohar, B., & O, S. (2019). Interlacing families and the Hermitian spectral norm of digraphs. Linear Algebra and its Applications, 564, 201-208. doi:10.1016/j.laa.2018.12.004 0024-3795 0000-0002-7408-6148 0000-0002-2182-6237 https://hdl.handle.net/10356/146676 10.1016/j.laa.2018.12.004 2-s2.0-85058094251 564 201 208 en Linear Algebra and its Applications © 2018 Elsevier Inc. All rights reserved. This paper was published in Linear Algebra and its Applications and is made available with permission of Elsevier Inc. application/pdf |
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Science::Mathematics Hermitian Adjacency Matrix Digraph |
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Science::Mathematics Hermitian Adjacency Matrix Digraph Greaves, Gary Royden Watson Mohar, Bojan O, Suil Interlacing families and the Hermitian spectral norm of digraphs |
| description |
It is proved that for any finite connected graph $G$, there exists an
orientation of $G$ such that the spectral radius of the corresponding Hermitian
adjacency matrix is smaller or equal to the spectral radius of the universal
cover of $G$ (with equality if and only if $G$ is a tree). This resolves a
problem proposed by Mohar. The proof uses the method of interlacing families of
polynomials that was developed by Marcus, Spielman, and Srivastava in their
seminal work on the existence of infinite families of Ramanujan graphs. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Greaves, Gary Royden Watson Mohar, Bojan O, Suil |
| format |
Article |
| author |
Greaves, Gary Royden Watson Mohar, Bojan O, Suil |
| author_sort |
Greaves, Gary Royden Watson |
| title |
Interlacing families and the Hermitian spectral norm of digraphs |
| title_short |
Interlacing families and the Hermitian spectral norm of digraphs |
| title_full |
Interlacing families and the Hermitian spectral norm of digraphs |
| title_fullStr |
Interlacing families and the Hermitian spectral norm of digraphs |
| title_full_unstemmed |
Interlacing families and the Hermitian spectral norm of digraphs |
| title_sort |
interlacing families and the hermitian spectral norm of digraphs |
| publishDate |
2021 |
| url |
https://hdl.handle.net/10356/146676 |
| _version_ |
1759858314748887040 |