On Vertex-Disjoint Chorded Cycles and Degree Sum Conditions

被引：0

作者：

Gould, Ronald J. ^{[1
]}

Hirohata, Kazuhide ^{[2
]}

Rorabaugh, Ariel Keller ^{[3
]}

机构：

[1] Department of Mathematics, Emory University, Atlanta,GA,30322, United States

[2] Department of Industrial Engineering, Computer Science, National Institute of Technology, Ibaraki College, Ibaraki, Hitachinaka,312-8508, Japan

[3] Department of Electrical Engineering and Computer Science, University of Tennessee, Knoxville,TN,37996, United States

来源：

Journal of Combinatorial Mathematics and Combinatorial Computing | 2024年 / 120卷

关键词：

In this paper; we consider a degree sum condition sufficient to imply the existence of k vertex-disjoint chorded cycles in a graph G. Let σ4(G) be the minimum degree sum of four independent vertices of G. We prove that if G is a graph of order at least 11k + 7 and σ4(G) ≥ 12k − 3 with k ≥ 1; then G contains k vertex-disjoint chorded cycles. We also show that the degree sum condition on σ4(G) is sharp. © 2024 the Author(s); licensee Combinatorial Press;

D O I：

10.61091/jcmcc120-07

中图分类号：

学科分类号：

摘要：

引用

页码：75 / 90

共 50 条

[21] A note on vertex-disjoint cycles
Verstraëte, J
COMBINATORICS PROBABILITY & COMPUTING, 2002, 11 (01): : 97 - 102
[22] Sharp minimum degree conditions for disjoint doubly chorded cycles
Santana, Michael
VAN Bonn, Maia
JOURNAL OF COMBINATORICS, 2024, 15 (02) : 217 - 282
[23] Graphs with many Vertex-Disjoint Cycles
Rautenbach, Dieter
Regen, Friedrich
DISCRETE MATHEMATICS AND THEORETICAL COMPUTER SCIENCE, 2012, 14 (02): : 75 - 82
[24] Independence number and vertex-disjoint cycles
Egawa, Yoshimi
Enomoto, Hikoe
Jendrol, Stanislav
Ota, Katsuhiro
Schiermeyer, Ingo
DISCRETE MATHEMATICS, 2007, 307 (11-12) : 1493 - 1498
[25] A CONJECTURE OF VERSTRAETE ON VERTEX-DISJOINT CYCLES
Gao, Jun
Ma, Jie
SIAM JOURNAL ON DISCRETE MATHEMATICS, 2020, 34 (02) : 1290 - 1301
[26] Vertex-disjoint cycles of the same length
Egawa, Y
JOURNAL OF COMBINATORIAL THEORY SERIES B, 1996, 66 (02) : 168 - 200
[27] Two vertex-disjoint cycles in a graph
Wang, H
GRAPHS AND COMBINATORICS, 1995, 11 (04) : 389 - 396
[28] Vertex-disjoint cycles in regular tournaments
Lichiardopol, Nicolas
DISCRETE MATHEMATICS, 2012, 312 (12-13) : 1927 - 1930
[29] Vertex-disjoint cycles in bipartite tournaments
Bai, Yandong
Li, Binlong
Li, Hao
DISCRETE MATHEMATICS, 2015, 338 (08) : 1307 - 1309
[30] Vertex-disjoint cycles of the same length
Verstraëte, J
JOURNAL OF COMBINATORIAL THEORY SERIES B, 2003, 88 (01) : 45 - 52

← 1 2 3 4 5 →