论文信息 - Connectivity keeping paths in k-connected bipartite graphs

Connectivity keeping paths in k-connected bipartite graphs

In 2010, Mader [W. Mader, Connectivity keeping paths in $k$-connected graphs, J. Graph Theory 65 (2010) 61-69.] proved that every $k$-connected graph $G$ with minimum degree at least $\lfloor\frac{3k}{2}\rfloor+m-1$ contains a path $P$ of order $m$ such that $G-V(P)$ is still $k$-connected. In this paper, we consider similar problem for bipartite graphs, and prove that every $k$-connected bipartite graph $G$ with minimum degree at least $k+m$ contains a path $P$ of order $m$ such that $G-V(P)$ is still $k$-connected.

Yingzhi Tian | Lian Luo | Liyun Wu

[1] Ken-ichi Kawarabayashi,et al. Connectivity keeping edges in graphs with large minimum degree , 2008, J. Comb. Theory, Ser. B.

[2] Wolfgang Mader. Connectivity keeping paths in k-connected graphs , 2010, J. Graph Theory.

[3] Qinghai Liu,et al. Connectivity keeping caterpillars and spiders in 2-connected graphs , 2021, Discret. Math..

[4] Kosuke Ono,et al. Connectivity keeping trees in 2-connected graphs , 2020, J. Graph Theory.

[5] Toru Hasunuma. Connectivity Keeping Trees in 2-Connected Graphs with Girth Conditions , 2020, IWOCA.

[6] Hong-Jian Lai,et al. Connectivity keeping stars or double-stars in 2-connected graphs , 2018, Discret. Math..

[7] Frank Harary,et al. Graph Theory , 2016 .

[8] Wolfgang Mader. Connectivity keeping trees in k-connected graphs , 2012, J. Graph Theory.

[9] Yahya Ould Hamidoune. On critically h-connected simple graphs , 1980, Discret. Math..

[10] Gary Chartrand,et al. Critically $n$-connected graphs , 1972 .

[11] Ajit A. Diwan,et al. Non-separating trees in connected graphs , 2009, Discret. Math..

[12] Changhong Lu,et al. Connectivity keeping trees in 2-connected graphs , 2020, Discret. Math..

[13] Hong-Jian Lai,et al. Nonseparating trees in 2-connected graphs and oriented trees in strongly connected digraphs , 2019, Discret. Math..