Bounds on Dimension Reduction in the Nuclear Norm

Abstract

S1 For all n 1, we give an explicit construction of m × m matrices A1,…,An with m = 2 n/2 such that for any d and d × d matrices A'1,…,A'n that satisfy \[ \|A'i-A'j\| \,≤\, \|Ai-Aj\|\,≤\, (1+δ) \|A'i-A'j\| \] for all i,j∈\1,…,n\ and small enough δ = O(n-c), where c> 0 is a universal constant, it must be the case that d 2 n/2 -1. This stands in contrast to the metric theory of commutative p spaces, as it is known that for any p≥ 1, any n points in p embed exactly in pd for d=n(n-1)/2. Our proof is based on matrices derived from a representation of the Clifford algebra generated by n anti-commuting Hermitian matrices that square to identity, and borrows ideas from the analysis of nonlocal games in quantum information theory.