Matchings in the hypercube with specified edges
Abstract
Given a matching M in the hypercube Qn, the profile of M is the vector x=(x1,…, xn) ∈ Nn such that M contains xi edges whose endpoints differ in the ith coordinate. If M is a perfect matching, then it is clear that ||x||1 = 2n-1 and it is easy to show that each xi must be even. Verifying a special case of a conjecture of Balister, Győri, and Schelp, we show that these conditions are also sufficient.
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