A classification of nilpotent $3$-BCI groups
(ندگان)پدیدآور
Koike, HirokiKovacs, Istvanنوع مدرک
TextResearch Paper
زبان مدرک
Englishچکیده
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 $bcay(G,T),$ $bcay(G,S) cong bcay(G,T)$ implies that $T = g S^alpha$ for some $g in G$ and $alpha in aut(G)$. A group $G$ is called an $m$-BCI-group if all bi-Cayley graphs of $G$ of valency at most $m$ are BCI-graphs. It was proved by Jin and Liu that, if $G$ is a $3$-BCI-group, then its Sylow $2$-subgroup is cyclic, or elementary abelian, or $Q$ [European J. Combin. 31 (2010) 1257--1264], and that a Sylow $p$-subgroup, $p$ is an odd prime, is homocyclic [Util. Math. 86 (2011) 313--320]. In this paper we show that the converse also holds in the case when $G$ is nilpotent, and hence complete the classification of nilpotent $3$-BCI-groups.
کلید واژگان
bi-Cayley graphBCI-group
graph isomorphism
05C25 Graphs and abstract algebra (groups, rings, fields, etc.)
شماره نشریه
2تاریخ نشر
2019-06-011398-03-11
ناشر
University of Isfahanسازمان پدید آورنده
National Autonomous University of MexicoUniversity of Primorska
شاپا
2251-76502251-7669




