论文信息 - Spanning Eulerian Subgraphs of 2-Edge-Connected Graphs

Spanning Eulerian Subgraphs of 2-Edge-Connected Graphs

For integers l and k with l > 0 and k > 0, let $${{\fancyscript{C}}(l, k)}$$ denote the family of 2-edge-connected graphs G such that for each bond cut |S| ≤ 3, each component of G − S has at least (|V(G)| − k)/l vertices. In this paper we prove that if $${G\in {\fancyscript{C}}(7, 0)}$$ , then G is not supereulerian if and only if G can be contracted to one of the nine specified graphs. Our result extends some earlier results (Catlin and Li in J Adv Math 160:65–69, 1999; Broersma and Xiong in Discrete Appl Math 120:35–43, 2002; Li et al. in Discrete Appl Math 145:422–428, 2005; Li et al. in Discrete Math 309:2937–2942, 2009; Lai and Liang in Discrete Appl Math 159:467–477, 2011).

Xiangwen Li | Chunxiang Wang | Liming Xiong | Zhaohong Niu | Qiong Fan

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

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

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

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

[5] Hong-Jian Lai,et al. Eulerian subgraphs and Hamilton-connected line graphs , 2005, Discret. Appl. Math..

[6] Blanche Descartes,et al. Review: J. A. Bondy and U. S. R. Murty, Graph theory with applications , 1977 .

[7] Yanting Liang,et al. Supereulerian graphs in the graph family C2(6, k) , 2011, Discret. Appl. Math..

[8] Hong-Jian Lai,et al. The supereulerian graphs in the graph family C(l, k) , 2009, Discret. Math..

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