The minimum number of Hamilton cycles in a hamiltonian threshold graph of a prescribed order
Abstract
We prove that the minimum number of Hamilton cycles in a hamiltonian threshold graph of order n is 2 (n-3)/2 and this minimum number is attained uniquely by the graph with degree sequence n-1,n-1,n-2,…, n/2, n/2,…,3,2 of n-2 distinct degrees. This graph is also the unique graph of minimum size among all hamiltonian threshold graphs of order n.
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