Bijections Between Smirnov Words and Hamiltonian Cycles in Complete Multipartite Graphs
Abstract
We establish a bijective correspondence between Smirnov words with balanced letter multiplicities and Hamiltonian paths in complete m-partite graphs Kn,n,…,n. This bijection allows us to derive closed inclusion-exclusion formulas for the number of Hamiltonian cycles in such graphs. We further extend the enumeration to the generalized nonuniform case Kn1,n2,…,nm. We also provide an asymptotic analysis based on Stirling's approximation, which yields compact factorial expressions and logarithmic expansions describing the growth of the number of Hamiltonian cycles in the considered graphs.
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