论文信息 - On infinite bridged graphs and strongly dismantlable graphs

On infinite bridged graphs and strongly dismantlable graphs

A graph G is bridged if it contains no isometric cycle of length greater than three. A graph G is strongly dismantlable if its vertices can be linearly ordered x0,…,xα so that, for each ordinal β<α, there exists a strictly increasing finite sequence (ij)0⩽j⩽n of ordinals such that i0=β, in=α and xij+1 is adjacent to xij and to all neighbors of xij in the subgraph of G induced by {xγ:β⩽γ⩽α}. We show that if a connected bridged graph G contains no infinite simplices and, if the vertex set of each ray of G contains an infinite bounded subset, then G is strongly dismantlable. Using this result and some properties of strongly dismantlable graphs, we obtain several invariant simplex properties and Helly-type theorems for bridged graphs.

Norbert Polat | N. Polat

[1] Norbert Polat. Stable graphs for a family of endomorphisms , 1996, Discret. Math..

[2] Norbert Polat. A Helly theorem for geodesic convexity in strongly dismantlable graphs , 1995, Discret. Math..

[3] Norbert Polat. Finite invariant simplices in infinite graphs , 1993 .

[4] Norbert Polat. Retract-collapsible graphs and invariant subgraph properties , 1995, J. Graph Theory.

[5] Victor Chepoi,et al. Bridged Graphs Are Cop-Win Graphs: An Algorithmic Proof , 1997, J. Comb. Theory, Ser. B.

[6] Hans-Jürgen Bandelt,et al. A Helly theorem in weakly modular space , 1996, Discret. Math..

[7] François Laviolette,et al. On cop-win graphs , 2002, Discret. Math..

[8] Peter Winkler,et al. Vertex-to-vertex pursuit in a graph , 1983, Discret. Math..

[9] Richard P. Anstee,et al. On bridged graphs and cop-win graphs , 1988, J. Comb. Theory, Ser. B.

[10] H. M. Mulder,et al. Helly Theorems for Dismantlable Graphs and Pseudo-Modular Graphs , 1990 .

[11] Martin Farber,et al. On local convexity in graphs , 1987, Discret. Math..