On digraphs with polygonal restricted numerical range
In 2020, Cameron et al. introduced the restricted numerical range of a digraph (directed graph) as a tool for characterizing digraphs and studying their algebraic connectivity. Notably, digraphs with a degenerate polygon (that is, a point or a line segment) as a restricted numerical range were compl...
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| Veröffentlicht in: | Linear algebra and its applications 2022-06, Vol.642, p.285-310 |
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| container_title | Linear algebra and its applications |
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| creator | Cameron, Thomas R. Hall, H. Tracy Small, Ben Wiedemann, Alexander |
| description | In 2020, Cameron et al. introduced the restricted numerical range of a digraph (directed graph) as a tool for characterizing digraphs and studying their algebraic connectivity. Notably, digraphs with a degenerate polygon (that is, a point or a line segment) as a restricted numerical range were completely described. In this article, we extend those results to include digraphs whose restricted numerical range is a non-degenerate convex polygon. In general, we refer to digraphs whose restricted numerical range is a degenerate or non-degenerate convex polygon as polygonal. We provide computational methods for identifying these polygonal digraphs and show that they can be broken into three disjoint classes: normal, restricted-normal, and pseudo-normal digraphs. Sufficient conditions for normal digraphs are provided, and we show that the directed join of two normal digraphs results in a restricted-normal digraph. Moreover, we prove that directed joins are the only restricted-normal digraphs when the order is square-free or twice a square-free number. Finally, we provide methods to construct restricted-normal digraphs that are not directed joins for all orders that are neither square-free nor twice a square-free number. |
| doi_str_mv | 10.1016/j.laa.2022.02.034 |
| format | Article |
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Sufficient conditions for normal digraphs are provided, and we show that the directed join of two normal digraphs results in a restricted-normal digraph. Moreover, we prove that directed joins are the only restricted-normal digraphs when the order is square-free or twice a square-free number. Finally, we provide methods to construct restricted-normal digraphs that are not directed joins for all orders that are neither square-free nor twice a square-free number.</description><identifier>ISSN: 0024-3795</identifier><identifier>EISSN: 1873-1856</identifier><identifier>DOI: 10.1016/j.laa.2022.02.034</identifier><language>eng</language><publisher>Amsterdam: Elsevier Inc</publisher><subject>Algebraic connectivity ; Directed graph ; Graph theory ; Laplacian ; Linear algebra ; Numerical range ; Polygons</subject><ispartof>Linear algebra and its applications, 2022-06, Vol.642, p.285-310</ispartof><rights>2022 Elsevier Inc.</rights><rights>Copyright American Elsevier Company, Inc. 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We provide computational methods for identifying these polygonal digraphs and show that they can be broken into three disjoint classes: normal, restricted-normal, and pseudo-normal digraphs. Sufficient conditions for normal digraphs are provided, and we show that the directed join of two normal digraphs results in a restricted-normal digraph. Moreover, we prove that directed joins are the only restricted-normal digraphs when the order is square-free or twice a square-free number. Finally, we provide methods to construct restricted-normal digraphs that are not directed joins for all orders that are neither square-free nor twice a square-free number.</description><subject>Algebraic connectivity</subject><subject>Directed graph</subject><subject>Graph theory</subject><subject>Laplacian</subject><subject>Linear algebra</subject><subject>Numerical range</subject><subject>Polygons</subject><issn>0024-3795</issn><issn>1873-1856</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2022</creationdate><recordtype>article</recordtype><recordid>eNp9UE1Lw0AQXUTBWv0B3gKeE2c_0-BJilah0Iuel_1KuiFN4m6q9N-7oZ6FBzPMvDe8eQjdYygwYPHYFp1SBQFCCkig7AIt8KqkOV5xcYkWAITltKz4NbqJsQUAVgJZIL7rM-uboMZ9zH78tM_GoTs1Q6-6LLg4BW8mZ7P-eHCpnYeqb9wtuqpVF93dX12iz9eXj_Vbvt1t3tfP29xQwqecV4JZQmtNamHAlowJx6raVFZVXHFsak4qTfhKaSs0pcYQyzQT2tp5pekSPZzvjmH4OiY7sh2OIXmLkpTpB-CCQmLhM8uEIcbgajkGf1DhJDHIOR3ZypSOnNORkEBZ0jydNS7Z__YuyGi8642zPjgzSTv4f9S_8XhsyA</recordid><startdate>20220601</startdate><enddate>20220601</enddate><creator>Cameron, Thomas R.</creator><creator>Hall, H. 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| ispartof | Linear algebra and its applications, 2022-06, Vol.642, p.285-310 |
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| language | eng |
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| subjects | Algebraic connectivity Directed graph Graph theory Laplacian Linear algebra Numerical range Polygons |
| title | On digraphs with polygonal restricted numerical range |
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