TY - JOUR
T1 - Some families of integral graphs
AU - Wang, Ligong
AU - Broersma, Hajo
AU - Hoede, Cornelis
AU - Li, Xueliang
AU - Still, Georg
PY - 2008/12/28
Y1 - 2008/12/28
N2 - A graph is called integral if all its eigenvalues (of the adjacency matrix) are integers. In this paper, the graphs K1, r • Kn, r * Kn, K1, r • Km, n, r * Km, n and the tree K1, s • T (q, r, m, t) are defined. We determine the characteristic polynomials of these graphs and also obtain sufficient and necessary conditions for these graphs to be integral. Some sufficient conditions are found by using the number theory and computer search. All these classes are infinite. Some new results which treat interrelations between integral trees of various diameters are also found. The discovery of these integral graphs is a new contribution to the search of such graphs.
AB - A graph is called integral if all its eigenvalues (of the adjacency matrix) are integers. In this paper, the graphs K1, r • Kn, r * Kn, K1, r • Km, n, r * Km, n and the tree K1, s • T (q, r, m, t) are defined. We determine the characteristic polynomials of these graphs and also obtain sufficient and necessary conditions for these graphs to be integral. Some sufficient conditions are found by using the number theory and computer search. All these classes are infinite. Some new results which treat interrelations between integral trees of various diameters are also found. The discovery of these integral graphs is a new contribution to the search of such graphs.
KW - General Pell's equation
KW - Integral graph
KW - Integral tree
KW - Spectrum
UR - http://www.scopus.com/inward/record.url?scp=56649107923&partnerID=8YFLogxK
U2 - 10.1016/j.disc.2007.12.010
DO - 10.1016/j.disc.2007.12.010
M3 - 文章
AN - SCOPUS:56649107923
SN - 0012-365X
VL - 308
SP - 6383
EP - 6391
JO - Discrete Mathematics
JF - Discrete Mathematics
IS - 24
ER -