Schurity of association schemes whose thin residues are elementary abelian \(p\)-groups of rank 2
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Publication:2025123
DOI10.1007/s10801-020-01000-yzbMath1475.05174OpenAlexW3120766974MaRDI QIDQ2025123
Publication date: 11 May 2021
Published in: Journal of Algebraic Combinatorics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10801-020-01000-y
Association schemes, strongly regular graphs (05E30) General theory for finite permutation groups (20B05) Combinatorial aspects of groups and algebras (05E16)
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Cites Work
- Characterization of \(p\)-valenced schemes of order \(p^2q\)
- Association schemes in which the thin residue is a finite cyclic group
- Some structure theory of table algebras and applications to association schemes
- Construction of association schemes from difference sets
- Schurity and separability of quasiregular coherent configurations
- On association schemes with thin thin residue
- Association schemes in which the thin residue is an elementary abelian \(p\)-group of rank 2
- Basic structure theory of association schemes
- On thin residues and basis digraphs of nilpotent table algebras and applications to nilpotent groups.
- On \(p\)-schemes of order \(p^3\)
- Schur rings and association schemes whose thin residues are thin
- Investigations on association schemes with elementary abelian thin residue
- On pseudocyclic association schemes
- Theory of Association Schemes
- On quasi-thin association schemes
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