On k-ordered Hamiltonian graphs

被引:0
|
作者
Kierstead, HA [1 ]
Sárközy, GN
Selkow, SM
机构
[1] Arizona State Univ, Dept Math, Tempe, AZ 85287 USA
[2] Worcester Polytech Inst, Dept Comp Sci, Worcester, MA 01609 USA
[3] MSRI, Berkeley, CA USA
来源
JOURNAL OF GRAPH THEORY | 1999年 / 32卷 / 01期
关键词
Hamiltonian graph; k-ordered;
D O I
10.1002/(SICI)1097-0118(199909)32:1<17::AID-JGT2>3.3.CO;2-7
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
A Hamiltonian graph G of order a is k-ordered, 2 less than or equal to k less than or equal to n, if for every sequence v(1), v(2),..., v(k), of k distinct vertices of G, there exists a Hamiltonian cycle that encounters vi, v(2),..., v(k) in this order. Define f(k, n) as the smallest integer m for which any graph on a vertices with minimum degree at least m is a k-ordered Hamiltonian graph. In this article, answering a question of Ng and Schultz, we determine f(k, n) if a is sufficiently large in terms of k. Let g(k, n) = [n/2] + [k/2] - 1. More precisely, we show that f(k, n) - g(k, n) if n greater than or equal to 11k - 3 Furthermore, we show that f(k, n) greater than or equal to g(k, n) for any n greater than or equal to 2k. Finally we show that f(k, n) > g(k, n) if 2k less than or equal to n less than or equal to 3k - 6. (C) 1999 John Wiley & Sons, Inc.
引用
收藏
页码:17 / 25
页数:9
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