An approximate isoperimetric inequality for r-sets
Abstract
We prove a vertex-isoperimetric inequality for [n](r), the set of all r-element subsets of 1,2,...,n, where x,y ∈ [n](r) are adjacent if |x y|=2. Namely, if A ⊂ [n](r) with |A|=α n r, then the vertex-boundary b(A) satisfies |b(A)| ≥ cnr(n-r) α(1-α) n r, where c is a positive absolute constant. For α bounded away from 0 and 1, this is sharp up to a constant factor (independent of n and r).
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