The Cayley isomorphism property for the group C^5_2 × C_p
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Publication:4993961
DOI10.26493/1855-3974.2348.f42zbMath1465.05080arXiv2005.14539OpenAlexW3122657524MaRDI QIDQ4993961
Grigoriĭ Konstantinovich Ryabov
Publication date: 11 June 2021
Published in: Ars Mathematica Contemporanea (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2005.14539
Arithmetic and combinatorial problems involving abstract finite groups (20D60) Graphs and abstract algebra (groups, rings, fields, etc.) (05C25) Isomorphism problems in graph theory (reconstruction conjecture, etc.) and homomorphisms (subgraph embedding, etc.) (05C60)
Uses Software
Cites Work
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- Elementary Abelian \(p\)-groups of rank \(2p+3\) are not CI-groups.
- CI-property of elementary abelian 3-groups
- Schur rings.
- A non-Cayley-invariant Cayley graph of the elementary Abelian group of order 64
- Isomorphism of circulant graphs and digraphs
- On isomorphisms of finite Cayley graphs
- On Ádám's conjecture for circulant graphs
- Elementary abelian groups of rank 5 are DCI-groups
- Elementary proofs that \(Z_p^2\) and \(Z_p^3\) are CI-groups
- On isomorphisms of finite Cayley graphs---a survey
- Ádám's conjecture is true in the square-free case
- Isomorphism problem for Cayley graphs of \(\mathbb{Z}^ 3_ p\)
- Elementary proof that \(\mathbb{Z}_p^4\) is a DCI-group
- Schur rings over the elementary abelian group of order 64
- On Schurity of Finite Abelian Groups
- The Group is a CI-Group
- Isomorphism problem for a class of point-symmetric structures
- CI-Property for Decomposable Schur Rings over an Abelian Group
- Isomorphism problem for a special class of graphs
- Graphs with circulant adjacency matrices
- An elementary Abelian group of rank 4 is a CI-group
