TY - JOUR
T1 - Circumference of a graph and its distance dominating longest cycles
AU - Fang, Yibin
AU - Xiong, Liming
N1 - Publisher Copyright:
© 2020 Elsevier B.V.
PY - 2021/2
Y1 - 2021/2
N2 - In this note, we prove the following: Let G be a k-connected graph (k≥2) with circumference c(G) and m a non-negative integer. Then • [(1)] Either c(G)≥(2m+2)k, or dG(v,C)≤m for any longest cycle C and any vertex v of G. • [(2)] Either c(G)≥(2m+3)k, or dG(e,C)≤m for any longest cycle C and any edge e of G. When m=0, C in (1) and (2) are well-known Hamiltonian cycle and dominating longest cycle, respectively. Moreover, we give graphs to show that the bounds on c(G) are all sharp, even for those graphs that are triangle-free with only possible exception m=0 in (2). (1) is also best possible for those graphs that are bipartite.
AB - In this note, we prove the following: Let G be a k-connected graph (k≥2) with circumference c(G) and m a non-negative integer. Then • [(1)] Either c(G)≥(2m+2)k, or dG(v,C)≤m for any longest cycle C and any vertex v of G. • [(2)] Either c(G)≥(2m+3)k, or dG(e,C)≤m for any longest cycle C and any edge e of G. When m=0, C in (1) and (2) are well-known Hamiltonian cycle and dominating longest cycle, respectively. Moreover, we give graphs to show that the bounds on c(G) are all sharp, even for those graphs that are triangle-free with only possible exception m=0 in (2). (1) is also best possible for those graphs that are bipartite.
KW - Circumference
KW - Connectivity
KW - Distance dominating cycle
UR - http://www.scopus.com/inward/record.url?scp=85094186526&partnerID=8YFLogxK
U2 - 10.1016/j.disc.2020.112196
DO - 10.1016/j.disc.2020.112196
M3 - Article
AN - SCOPUS:85094186526
SN - 0012-365X
VL - 344
JO - Discrete Mathematics
JF - Discrete Mathematics
IS - 2
M1 - 112196
ER -