Solution of the propeller conjecture in R3

Abstract

It is shown that every measurable partition A1,..., Ak of R3 satisfies Σi=1k||∫Ai xe-12||x||22dx||22 9π2.(*) Let P1,P2,P3 be the partition of R2 into 120 sectors centered at the origin. The bound is sharp, with equality holding if Ai=Pi× R for i∈ 1,2,3 and Ai= for i∈ \4,...,k\ (up to measure zero corrections, orthogonal transformations and renumbering of the sets \A1,...,Ak\). This settles positively the 3-dimensional Propeller Conjecture of Khot and Naor (FOCS 2008). The proof of reduces the problem to a finite set of numerical inequalities which are then verified with full rigor in a computer-assisted fashion. The main consequence (and motivation) of (*) is complexity-theoretic: the Unique Games hardness threshold of the Kernel Clustering problem with 4 × 4 centered and spherical hypothesis matrix equals 2π3.