Nomadic Decompositions of Bidirected Complete Graphs
Abstract
We use K*n to denote the bidirected complete graph on n vertices. A nomadic Hamiltonian decomposition of K*n is a Hamiltonian decomposition, with the additional property that ``nomads'' walk along the Hamiltonian cycles (moving one vertex per time step) without colliding. A nomadic near-Hamiltonian decomposition is defined similarly, except that the cycles in the decomposition have length n-1, rather than length n. J.A. Bondy asked whether these decompositions of K*n exist for all n. We show that K*n admits a nomadic near-Hamiltonian decomposition when n 2 4.
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