Reinterpreting the Middle-Levels Theorem via Natural Enumeration of Ordered Trees
Abstract
Let 0<k∈Z. A reinterpretation of the proof of existence of Hamilton cycles in the middle-levels graph Mk induced by the vertices of the (2k+1)-cube representing the k- and (k+1)-subsets of \0,…,2k\ is given via an associated dihedral quotient graph of Mk whose vertices represent the ordered (rooted) trees of order k+1 and size k.
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