Jinyoung Park
Published 2021-03-20Version 1
Let $Q_d$ be the $d$-dimensional Hamming cube and $N=|V(Q_d)|=2^d$. An independent set $I$ in $Q_d$ is called balanced if $I$ contains the same number of even and odd vertices. We show that the logarithm of the number of balanced independent sets in $Q_d$ is \[(1-\Theta(1/\sqrt d))N/2.\] The key ingredient of the proof is an improved version of "Sapozhenko's graph container lemma."
Comments: 6 pages. Comments are welcome!
A note on balanced independent sets in the cube
Intersecting families of sets are typically trivial
Independent sets in middle two layers of Boolean lattice
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