Extremal graphs and classification of planar graphs by MC-numbers

Abstract

An edge-coloring of a connected graph G is called a monochromatic connection coloring (MC-coloring for short) if any two vertices of G are connected by a monochromatic path in G. For a connected graph G, the monochromatic connection number (MC-number for short) of G, denoted by mc(G), is the maximum number of colors that ensure G has a monochromatic connection coloring by using this number of colors. This concept was introduced by Caro and Yuster in 2011. They proved that mc(G)≤ m-n+k if G is not a k-connected graph. In this paper we depict all graphs with mc(G)=m-n+k+1 and mc(G)= m-n+k if G is a k-connected but not (k+1)-connected graph. We also prove that mc(G)≤ m-n+4 if G is a planar graph, and classify all planar graphs by their monochromatic connectivity numbers.