Deploying robots with two sensors in K1,6-free graphs

Abstract

Let G be a graph of minimum degree at least two with no induced subgraph isomorphic to K1,6. We prove that if G is not isomorphic to one of eight exceptional graphs, then it is possible to assign two-element subsets of \1,2,3,4,5\ to the vertices of G in such a way that for every i∈\1,2,3,4,5\ and every vertex v∈ V(G) the label i is assigned to v or one of its neighbors. It follows that G has fractional domatic number at least 5/2. This is motivated by a problem in robotics and generalizes a result of Fujita, Yamashita and Kameda who proved that the same conclusion holds for all 3-regular graphs.