The number of colorings of the middle layers of the Hamming cube
Abstract
For an odd integer n = 2d-1, let Bd be the subgraph of the hypercube Qn induced by the two largest layers. In this paper, we describe the typical structure of proper q-colorings of V( Bd) and give asymptotics on the number of them. The proofs use various tools including information theory (entropy), Sapozhenko's graph container method and a recently developed method of M. Jenssen and W. Perkins that combines Sapozhenko's graph container lemma with the cluster expansion for polymer models from statistical physics.
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