论文信息 - Spanning Trees with Few Leaves

Spanning Trees with Few Leaves

In this paper, we prove that an m-connected graph G on n vertices has a spanning tree with at most k leaves (for k ≥ 2 and m ≥ 1) if every independent set of G with cardinality m + k contains at least one pair of vertices with degree sum at least n − k + 1. This is a common generalization of results due to Broersma and Tuinstra and to Win.

Tomoki Yamashita | Masao Tsugaki | T. Yamashita | M. Tsugaki

[1] O. Ore. Note on Hamilton Circuits , 1960 .

[2] Sein Win. On a conjecture of Las Vergnas concerning certain spanning trees in graphs , 1979 .

[3] Haitze J. Broersma,et al. Independence trees and Hamilton cycles , 1998 .

[4] Paul Erdös,et al. A note on Hamiltonian circuits , 1972, Discret. Math..

[5] J. A. Bondy,et al. Basic graph theory: paths and circuits , 1996 .