List version of (p,1)-total labellings

Abstract

The (p,1)-total number λpT(G) of a graph G is the width of the smallest range of integers that suffices to label the vertices and the edges of G such that no two adjacent vertices have the same label, no two incident edges have the same label and the difference between the labels of a vertex and its incident edges is at least p. In this paper we consider the list version. Let L(x) be a list of possible colors for all x∈ V(G) E(G). Define Cp,1T(G) to be the smallest integer k such that for every list assignment with |L(x)|=k for all x∈ V(G) E(G), G has a (p,1)-total labelling c such that c(x)∈ L(x) for all x∈ V(G) E(G). We call Cp,1T(G) the (p,1)-total labelling choosability and G is list L-(p,1)-total labelable. In this paper, we present a conjecture on the upper bound of Cp,1T. Furthermore, we study this parameter for paths and trees in Section 2. We also prove that Cp,1T(K1,n)≤ n+2p-1 for star K1,n with p≥2, n≥3 in Section 3 and Cp,1T(G)≤ +2p-1 for outerplanar graph with ≥ p+3 in Section 4.