CHARACTERIZATIONS OF GRAPHS HAVING LARGE PROPER CONNECTION NUMBERS

Let G be an edge-colored connected graph. A path P is a proper path in G if no two adjacent edges of P are colored the same. if P is a proper u - v path of length d(u, v), then P is a proper u - v geodesic. An edge coloring c is a proper-path coloring of a connected graph G if every pair u, v of distinct vertices of G are connected by a proper u - v path in G, and c is a strong proper-path coloring if every two vertices u and v are connected by a proper u - v geodesic in G. The minimum number of colors required for a proper-path coloring or strong proper-path coloring of G is called the proper connection number pc(G) or strong proper connection number spc(G) of G, respectively. if G is a nontrivial connected graph of size m, then pc(G) <= spc(G) <= m and pc(G) = m or spc(G) = m if and only if G is the star of size m. In this paper, we determine all connected graphs G of size m for which pc(G) or spc(G) is m - 1, m - 2 or m - 3.