Coloring the normalized Laplacian for oriented hypergraphs

Authors :: Dong Zhang
Raffaella Mulas
Aida Abiad
Mathematics
Digital Mathematics
Combinatorial Optimization 1
EAISI Foundational
Source :: Linear Algebra and its Applications, 629, 192-207. Elsevier Inc., Linear Algebra and Its Applications, 629, 192-207. Elsevier, Abiad, A, Mulas, R & Zhang, D 2021, ' Coloring the normalized Laplacian for oriented hypergraphs ', Linear Algebra and its Applications, vol. 629, pp. 192-207 . https://doi.org/10.1016/j.laa.2021.07.018
Publication Year :: 2021
Publisher :: Elsevier Inc., 2021.
Abstract: The independence number, coloring number and related parameters are investigated in the setting of oriented hypergraphs using the spectrum of the normalized Laplace operator. For the independence number, both an inertia--like bound and a ratio--like bound are shown. A Sandwich Theorem involving the clique number, the vector chromatic number and the coloring number is proved, as well as a lower bound for the vector chromatic number in terms of the smallest and the largest eigenvalue of the normalized Laplacian. In addition, spectral partition numbers are studied in relation to the coloring number.<br />Comment: Linear Algebra and Its Applications, To appear

Language :: English
ISSN :: 00243795
Database :: OpenAIRE
Journal :: Linear Algebra and its Applications, 629, 192-207. Elsevier Inc., Linear Algebra and Its Applications, 629, 192-207. Elsevier, Abiad, A, Mulas, R & Zhang, D 2021, ' Coloring the normalized Laplacian for oriented hypergraphs ', Linear Algebra and its Applications, vol. 629, pp. 192-207 . https://doi.org/10.1016/j.laa.2021.07.018
Accession number :: edsair.doi.dedup.....c14e11751c8be53e60861b44055e6511
Full Text :: https://doi.org/10.1016/j.laa.2021.07.018