A stability result for the cube edge isoperimetric inequality
Abstract
We prove the following stability version of the edge isoperimetric inequality for the cube: any subset of the cube with average boundary degree within K of the minimum possible is -close to a union of L disjoint cubes, where L ≤ L(K, ) is independent of the dimension. This extends a stability result of Ellis, and can viewed as a dimension-free version of Friedgut's junta theorem.
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