Some results on the rainbow vertex-disconnection colorings of graphs

Abstract

Let G be a nontrivial connected and vertex-colored graph. A vertex subset X is called rainbow if any two vertices in X have distinct colors. The graph G is called rainbow vertex-disconnected if for any two vertices x and y of G, there exists a vertex subset S such that when x and y are nonadjacent, S is rainbow and x and y belong to different components of G-S; whereas when x and y are adjacent, S+x or S+y is rainbow and x and y belong to different components of (G-xy)-S. For a connected graph G, the rainbow vertex-disconnection number of G, rvd(G), is the minimum number of colors that are needed to make G rainbow vertex-disconnected. In this paper, we prove for any K4-minor free graph, rvd(G)≤ (G) and the bound is sharp. We show it is NP-complete to determine the rainbow vertex-disconnection number for bipartite graphs and split graphs. Moreover, we show for every ε>0, it is impossible to efficiently approximate the rainbow vertex-disconnection number of any bipartite graph and split graph within a factor of n13-ε unless ZPP=NP.