Incidence matrices of finite attenuated spaces and class dimension of association schemes
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Publication:393162
DOI10.1016/J.DISC.2013.10.003zbMath1278.05249OpenAlexW2144984542MaRDI QIDQ393162
Kaishun Wang, Jun Guo, Feng-Gao Li
Publication date: 16 January 2014
Published in: Discrete Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.disc.2013.10.003
Association schemes, strongly regular graphs (05E30) Finite affine and projective planes (geometric aspects) (51E15)
Related Items (8)
A \(Q\)-polynomial structure for the attenuated space poset \(\mathcal{A}_q (N, M)\) ⋮ Class dimension of association schemes in singular linear spaces ⋮ Metric dimension of dual polar graphs ⋮ The effect of edge weights on clique weights ⋮ On the metric dimension of incidence graphs ⋮ On the metric dimension of imprimitive distance-regular graphs ⋮ The attenuated space poset \(\mathcal{A}_q(N, M)\) ⋮ Several anzahl formulas of classical spaces and their applications
Cites Work
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- Character tables of association schemes based on attenuated spaces
- On the metric dimension of bilinear forms graphs
- Association schemes based on attenuated spaces
- Partitions of finite vector spaces: an application of the Frobenius number in geometry
- On incidence matrices of finite projective and affine spaces
- Base size, metric dimension and other invariants of groups and graphs
- On the metric dimension of Grassmann graphs
- A Certain Class of Incidence Matrices
- A note on the ranks of set-inclusion matrices
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