The sharp asymptotic density of zero-sum-free spherical sets

Abstract

A measurable set A⊂eq Sd-1 is called zero-sum-free if there are no x,y,z∈ A with x+y+z=0. Bukh asked whether every zero-sum-free measurable subset of Sd-1, for d3, has normalized surface measure at most 12. He also pointed out that even the asymptotic behavior as d∞ was unknown. We answer Bukh's asymptotic question by proving that every such set has normalized surface measure at most (d+1)2/2d(d+1)=12+O(1d). Since the lower bound 12 comes from open hemispheres, this determines the asymptotic extremal density. By monotonicity, upper bounds in low-dimensional cases are especially important. We use a stability argument to improve the bound from 35 to 71120 in dimensions 4 and 5.

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