Dispersed graph labellings
Abstract
A k-dispersed labelling of a graph G on n vertices is a labelling of the vertices of G by the integers 1, … , n such that d(i,i+1) ≥ k for 1 ≤ i ≤ n-1. DL(G) denotes the maximum value of k such that G has a k-dispersed labelling. In this paper, we study upper and lower bounds on DL(G). Computing DL(G) is NP-hard. However, we determine the exact values of DL(G) for cycles, paths, grids, hypercubes and complete binary trees. We also give a product construction and we prove a degree-based bound.
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