Distance-constrained labellings of Cartesian products of graphs

Abstract

An L(h1, h2, …, hl)-labelling of a graph G is a mapping φ: V(G) → \0, 1, 2, …\ such that for 1 i l and each pair of vertices u, v of G at distance i, we have |φ(u) - φ(v)| ≥ hi. The span of φ is the difference between the largest and smallest labels assigned to the vertices of G by φ, and λh1, h2, …, hl(G) is defined as the minimum span over all L(h1, h2, …, hl)-labellings of G. In this paper we study λh, 1, …, 1 for Cartesian products of graphs, where (h, 1, …, 1) is an l-tuple with l 3. We prove that, under certain natural conditions, the value of this and three related invariants on a graph H which is the Cartesian product of l graphs attain a common lower bound. In particular, the chromatic number of the l-th power of H equals this lower bound plus one. We further obtain a sandwhich theorem which extends the result to a family of subgraphs of H which contain a certain subgraph of H. All these results apply in particular to the class of Hamming graphs: if q1 ·s qd 2 and 3 l d then the Hamming graph H=Hq1,q2,… ,qd satisfies λql,1,…,1(H) = q1q2… ql-1 whenever q1q2… ql-1>3(ql-1+1)ql… qd. In particular, this settles a case of the open problem on the chromatic number of powers of the hypercubes.