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Bicyclic oriented graphs with skew-rank 6
Applied Mathematics and Computation, 2015zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Lu, Yong, Wang, Ligong, Zhou, Qiannan
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Computing the Scattering Number of Bicyclic Graphs
2010 International Conference on Computational Intelligence and Security, 2010The scattering number of a noncomplete connected graph $G$ is defined by $s(G)=\max\{\omega(G-X)-|X|:X\subset V(G), \omega(G-X)\ge 2\}$, where $\omega(G-X)$ denotes the number of components of $G-X$. This parameter can be used to measure the vulnerability of networks.
Bing Chen, Shenggui Zhang
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ON THE NULL-SPACES OF BICYCLIC SINGULAR GRAPHS
Discrete Mathematics, Algorithms and Applications, 2011In [M. Nath and B. K. Sarma, On the null-spaces of unicyclic and acyclic graphs, Linear Algebra Appl.427 (2007) 42–54], Nath and Sarma gave an algorithm to find a basis for the null-space of a graph G when G is singular acyclic or unicyclic. In this paper, we find a basis for the null-space of G when G is a bicyclic singular graph.
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Extremal Arithmetic–Geometric Index of Bicyclic Graphs
Circuits, Systems, and Signal Processing, 2023Niu, Baohua, Zhou, Shuming, Zhang, Hong
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Bicyclic Graphs with Nullity n−5
2013Let \( G \) be a simple undirected graph on n vertices, \( A(G) \) be its adjacency matrix. The nullity \( \eta (G) \) of the graph \( G \) is the multiplicity of the eigenvalue zero in its spectrum. In this paper, we characterize the bicyclic graphs with nullity \( n - 5 \).
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The AME 2020 atomic mass evaluation (II). Tables, graphs and references*
Chinese Physics C, 2021Meng Wang, Filip Kondev, Sarah Naimi
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Haplotype-resolved de novo assembly using phased assembly graphs with hifiasm
Nature Methods, 2021Haoyu Cheng +2 more
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