The (k,)-proper index of graphs

Abstract

A tree T in an edge-colored graph is called a proper tree if no two adjacent edges of T receive the same color. Let G be a connected graph of order n and k be an integer with 2≤ k ≤ n. For S⊂eq V(G) and |S| 2, an S-tree is a tree containing the vertices of S in G. Suppose \T1,T2,…,T\ is a set of S-trees, they are called internally disjoint if E(Ti) E(Tj)= and V(Ti) V(Tj)=S for 1≤ i≠ j≤ . For a set S of k vertices of G, the maximum number of internally disjoint S-trees in G is denoted by (S). The -connectivity k(G) of G is defined by k(G)=\(S) S is a k-subset of V(G)\. For a connected graph G of order n and for two integers k and with 2 k n and 1≤ ≤ k(G), the (k,)-proper index pxk,(G) of G is the minimum number of colors that are needed in an edge-coloring of G such that for every k-subset S of V(G), there exist internally disjoint proper S-trees connecting them. In this paper, we show that for every pair of positive integers k and with k 3, there exists a positive integer N1=N1(k,) such that pxk,(Kn) = 2 for every integer n N1, and also there exists a positive integer N2=N2(k,) such that pxk,(Km,n) = 2 for every integer n N2 and m=O(nr) (r 1). In addition, we show that for every p c[k]a nn (c 5), pxk,(Gn,p) 2 holds almost surely, where Gn,p is the Erd\"os-R\'enyi random graph model.