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This is a Quantitative Study study.

October 13, 2025Open Access

On CI-property of normal Cayley digraphs over abelian groups

Key Points

The study focuses on the CI-property of normal Cayley digraphs over abelian groups, revealing critical structural aspects.
Results show that every normal Cayley digraph over an abelian p-group of order at most p^5 is CI, with p as an odd prime.
The authors reduce the case of arbitrary abelian groups to abelian p-groups, highlighting the significance of this reduction.
This work contributes valuable insights into the relationship between group automorphisms and Cayley digraphs in algebra.

Abstract

A Cayley digraph over a finite group G is said to be CI if for every Cayley digraph ^ over G isomorphic to, there is an isomorphism from to ^ which is at the same time an automorphism of G. In the present paper, we study a CI-property of normal Cayley digraphs over abelian groups, i. e. such Cayley digraphs that the group Gᵣ of all right translations of G is normal in Aut (). At first, we reduce the case of an arbitrary abelian group to the case of an abelian p-group. Further, we obtain several results on CI-property of normal Cayley digraphs over abelian p-groups. In particular, we prove that every normal Cayley digraph over an abelian p-group of order at most p⁵, where p is an odd prime, is CI.

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Cite This Study

Grigory Ryabov (Sun,) studied this question.

synapsesocial.com/papers/68ecc715d1cc7436f7d18bf0 https://doi.org/https://doi.org/10.48550/arxiv.2503.00859