Matchings in hypercubes extend to long cycles
Abstract
The d-dimensional hypercube graph Qd has as vertices all subsets of \1,…,d\, and an edge between any two sets that differ in a single element. The Ruskey-Savage conjecture asserts that every matching of Qd, d 2, can be extended to a Hamilton cycle, i.e., to a cycle that visits every vertex exactly once. We prove that every matching of Qd, d 2, can be extended to a cycle that visits at least a 2/3-fraction of all vertices.
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