Tripartite Bell inequality, random matrices and trilinear forms

Abstract

In this seminar report, we present in detail the proof of a recent result due to J. Bri\"et and T. Vidick, improving an estimate in a 2008 paper by D. P\'erez-Garc\'a, M. Wolf, C. Palazuelos, I. Villanueva, and M. Junge, estimating the growth of the deviation in the tripartite Bell inequality. The proof requires a delicate estimate of the norms of certain trilinear (or d-linear) forms on Hilbert space with coefficients in the second Gaussian Wiener chaos. Let En (resp. En) denote 1n 1n 1n equipped with the injective (resp. minimal) tensor norm. Here 1n is equipped with its maximal operator space structure. The Bri\"et-Vidick method yields that the identity map In satisfies (for some c>0) \|In:\ En En\| c n1/4 ( n)-3/2. Let Sn2 denote the (Hilbert) space of n× n-matrices equipped with the Hilbert-Schmidt norm. While a lower bound closer to n1/2 is still open, their method produces an interesting, asymptotically almost sharp, related estimate for the map Jn:\ Sn2 Sn2Sn2 2n3 2n3 taking ei,j ek,l em,n to e[i,k,m],[j,l,n].