Matchings in Hypercubes Extend to Long Cycles
Abstract
The n-dimensional hypercube graph Qn has as vertices all subsets of \1, …, n\, and an edge between any two sets that differ in a single element. The Ruskey-Savage conjecture states that every matching of the n-dimensional hypercube Qn can be extended into a Hamilton cycle. We prove that matchings of Qn containing edges spanning at most d = 5 directions can be extended into a Hamilton cycle. We also characterize when these matchings of most d = 5 directions can be extended into a Hamilton path between two prescribed vertices. Our proofs work for arbitrary d and n where d n assuming some extension properties hold in Qd which we verified by a computer for d=5.
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