论文信息 - Eulerian subgraphs and Hamilton-connected line graphs

Eulerian subgraphs and Hamilton-connected line graphs

Let C(l,k) denote a class of 2-edge-connected graphs of order n such that a graph G ∈ C(l,k) if and only if for every edge cut S ⊆ E(G) with |S| ≤ 3, each component of G-S has order at least (n-k)/l. We prove the following: (1) If G ∈ C(6,0), then G is supereulerian if and only if G cannot be contracted to K2,3, K2,5 or K2,3(e), where e ∈ E(K2,3) and K2,3(e) stands for a graph obtained from K2,3 by replacing e by a path of length 2. (2) If G ∈ C(6, 0) and n≥7, then L(G) is Hamilton-connected if and only if κ(L(G))≥3. Former results by Catlin and Li, and by Broersma and Xiong are extended.

Hong-Jian Lai | Mingquan Zhan | Dengxin Li

[1] F. Harary,et al. On Eulerian and Hamiltonian Graphs and Line Graphs , 1965, Canadian Mathematical Bulletin.

[2] Hajo Broersma,et al. A note on minimum degree conditions for supereulerian graphs , 2002, Discret. Appl. Math..

[3] J. A. Bondy,et al. Graph Theory with Applications , 1978 .

[4] Hong-Jian Lai,et al. Supereulerian Graphs and the Petersen Graph , 1996, J. Comb. Theory, Ser. B.

[5] Hong-Jian Lai,et al. Supereulerian graphs and the Petersen Graph, II , 1998, Ars Comb..

[6] Zhi-Hong Chen. Supereuleriaun graphs and the Petersen graph , 1991 .

[7] François Jaeger. A Note on Sub-Eulerian Graphs , 1979, J. Graph Theory.

[8] Hong-Jian Lai,et al. Graphs without spanning closed trails , 1996, Discret. Math..

[9] J. A. Bondy,et al. Graph Theory with Applications , 1978 .

[10] Paul A. Catlin,et al. A reduction method to find spanning Eulerian subgraphs , 1988, J. Graph Theory.