List rainbow connection number of graphs

Abstract

An edge-coloured path is rainbow if all of its edges have distinct colours. Let G be a connected graph. The rainbow connection number of G, denoted by rc(G), is the minimum number of colours in an edge-colouring of G such that, any two vertices are connected by a rainbow path. The strong rainbow connection number of G, denoted by src(G), is the minimum number of colours in an edge-colouring of G such that, any two vertices are connected by a rainbow geodesic (i.e., a path of shortest length). These two notions of connectivity of graphs were introduced by Chartrand, Johns, McKeon and Zhang in 2008. In this paper, we introduce the list rainbow connection number rc(G), and the list strong rainbow connection number src(G). These two parameters are the versions of rc(G) and src(G) that involve list edge-colourings. Among our results, we will determine the list rainbow connection number and list strong rainbow connection number of some specific graphs. We will also characterise all pairs of positive integers a and b such that, there exists a connected graph G with src(G)=a and src(G)=b, and similarly for the pair rc and src. Finally, we propose the question of whether or not we have rc(G)=rc(G), for all connected graphs G.

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