\(\mathbb{Z}_3^8\) is not a CI-group
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Publication:6619399
DOI10.26493/1855-3974.3087.F36zbMATH Open1548.05166MaRDI QIDQ6619399
Publication date: 15 October 2024
Published in: Ars Mathematica Contemporanea (Search for Journal in Brave)
Graphs and abstract algebra (groups, rings, fields, etc.) (05C25) Directed graphs (digraphs), tournaments (05C20) Isomorphism problems in graph theory (reconstruction conjecture, etc.) and homomorphisms (subgraph embedding, etc.) (05C60)
Cites Work
- Elementary Abelian \(p\)-groups of rank \(2p+3\) are not CI-groups.
- CI-property of elementary abelian 3-groups
- A non-Cayley-invariant Cayley graph of the elementary Abelian group of order 64
- Corrigendum to: On Ádám's conjecture for circulant graphs
- Some new groups which are not CI-groups with respect to graphs
- Elementary abelian groups of rank 5 are DCI-groups
- An elementary abelian group of large rank is not a CI-group
- Ádám's conjecture is true in the square-free case
- Further restrictions on the structure of finite CI-groups
- Elementary abelian \(p\)-groups of rank greater than or equal to \(4p-2\) are not CI-groups.
- Isomorphism problem for a class of point-symmetric structures
- Generalized dihedral CI-groups
- Non-Cayley-isomorphic Cayley graphs from non-Cayley-isomorphic Cayley digraphs
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