Graphs cospectral with a friendship graph or its complement
(ندگان)پدیدآور
Abdollahi, AlirezaJanbaz, ShahroozOboudi, Mohammad Rezaنوع مدرک
TextResearch Paper
زبان مدرک
Englishچکیده
Let $n$ be any positive integer and $F_n$ be the friendship (or Dutch windmill) graph with $2n+1$ vertices and $3n$ edges. Here we study graphs with the same adjacency spectrum as $F_n$. Two graphs are called cospectral if the eigenvalues multiset of their adjacency matrices are the same. Let $G$ be a graph cospectral with $F_n$. Here we prove that if $G$ has no cycle of length $4$ or $5$, then $Gcong F_n$. Moreover if $G$ is connected and planar then $Gcong F_n$. All but one of connected components of $G$ are isomorphic to $K_2$. The complement $overline{F_n}$ of the friendship graph is determined by its adjacency eigenvalues, that is, if $overline{F_n}$ is cospectral with a graph $H$, then $Hcong overline{F_n}$.
کلید واژگان
Friendship graphscospectral graphs
adjacency eigenvalues
05C31 Graph polynomials
05C50 Graphs and linear algebra (matrices, eigenvalues, etc.)
شماره نشریه
4تاریخ نشر
2013-12-011392-09-10
ناشر
University of Isfahanسازمان پدید آورنده
University of IsfahanUniversity of Isfahan
University of Isfahan
شاپا
2251-86572251-8665




