The number of 4-colorings of the Hamming cube
Abstract
Let Qd be the d-dimensional hypercube and N=2d. We prove that the number of (proper) 4-colorings of Qd is asymptotically \[6e2N,\] as was conjectured by Engbers and Galvin in 2012. The proof uses a combination of information theory (entropy) and isoperimetric ideas originating in work of Sapozhenko in the 1980's.
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