Resolving Matrix Spencer Conjecture Up to Poly-logarithmic Rank

Abstract

We give a simple proof of the matrix Spencer conjecture up to poly-logarithmic rank: given symmetric d × d matrices A1,…,An each with \|Ai\|op ≤ 1 and rank at most n/3 n, one can efficiently find 1 signs x1,…,xn such that their signed sum has spectral norm \|Σi=1n xi Ai\|op = O(n). This result also implies a n - ( n) qubit lower bound for quantum random access codes encoding n classical bits with advantage 1/n. Our proof uses the recent refinement of the non-commutative Khintchine inequality in [Bandeira, Boedihardjo, van Handel, 2022] for random matrices with correlated Gaussian entries.