A classification of nilpotent $3$-BCI groups

A classification of nilpotent $3$-BCI groups

‎‎Given a finite group $G$ and a subset $Ssubseteq G,$ the bi-Cayley graph $bcay(G,S)$ is the graph whose vertex‎ ‎set is $G times {0,1}$ and edge set is‎ ‎${ {(x,0),(s x,1)}‎ : ‎x in G‎, ‎sin S }$‎. ‎A bi-Cayley graph $bcay(G,S)$ is called a BCI-graph if for any bi-Cayley graph‎ ‎$bcay(G,T),$ $bcay...

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Bibliographic Details
Main Authors: Hiroki Koike, Istvan Kovacs
Format: Article
Language:English
Published: University of Isfahan 2019-06-01
Series:International Journal of Group Theory
Subjects:
‎bi-Cayley graph‎
‎BCI-group‎
‎graph isomorphism
Online Access:http://ijgt.ui.ac.ir/article_22202_277a0945cb23c54a90741a9b98909611.pdf

Internet

http://ijgt.ui.ac.ir/article_22202_277a0945cb23c54a90741a9b98909611.pdf

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