Finding all H-Eigenvalues of Signless Laplacian Tensor for a Uniform Loose Path of Length Three

DOI10.1142/S0217595920400072zbMath1457.15012OpenAlexW3028386028MaRDI QIDQ5149521

Publication date: 11 February 2021

Published in: Asia-Pacific Journal of Operational Research (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1142/s0217595920400072

zbMATH Keywords

hypergraph signless Laplacian tensor $H$-eigenvalue loose path

Mathematics Subject Classification ID

Hypergraphs (05C65) Graphs and linear algebra (matrices, eigenvalues, etc.) (05C50) Eigenvalues, singular values, and eigenvectors (15A18) Multilinear algebra, tensor calculus (15A69)

Related Items (1)

On the spectral radius of uniform weighted hypergraph

Cites Work

The $H$-spectra of a class of generalized power hypergraphs
Symmetric nonnegative tensors and copositive tensors
Spectra of uniform hypergraphs
$H^{+}$-eigenvalues of Laplacian and signless Laplacian tensors
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Largest adjacency, signless Laplacian, and Laplacian H-eigenvalues of loose paths
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H-eigenvalues of signless Laplacian tensor for an even uniform hypergraph
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The Laplacian of a uniform hypergraph
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Regular uniform hypergraphs, $s$-cycles, $s$-paths and their largest Laplacian H-eigenvalues
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Computing Eigenvalues of Large Scale Sparse Tensors Arising from a Hypergraph
$M$-Tensors and Some Applications
The Z -eigenvalues of a symmetric tensor and its application to spectral hypergraph theory
Some spectral properties and characterizations of connected odd-bipartite uniform hypergraphs

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