The largest sum-free subset of [n]^d has limiting density achieved by two hyperplane slices; equivalently, the maximum measure of a sum-free set in the unit hypercube is attained by a linear functional slice between 1 and 2.
Size of the largest sum-free subset of [n] 3 and [n] 4
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On the largest sum-free subset of the lattice cube
The largest sum-free subset of [n]^d has limiting density achieved by two hyperplane slices; equivalently, the maximum measure of a sum-free set in the unit hypercube is attained by a linear functional slice between 1 and 2.