Properties of the Fibonacci-sum graph
Abstract
For each positive integer n, the Fibonacci-sum graph Gn on vertices 1,2,…,n is defined by two vertices forming an edge if and only if they sum to a Fibonacci number. It is known that each Gn is bipartite, and all Hamiltonian paths in each Gn have been classified. In this paper, it is shown that each Gn has at most one non-trivial automorphism, which is given explicitly. Other properties of Gn are also found, including the degree sequence, the treewidth, the nature of the bipartition, and that Gn is outerplanar.
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