A lower bound for the Balan--Jiang matrix problem

Abstract

We prove the existence of a positive semidefinite matrix A ∈ Rn × n such that any decomposition into rank-1 matrices has to have factors with a large 1-norm, more precisely Σk xk xk*=A Σk \|xk\|21 ≥ c n \|A\|1, where c is independent of n. This provides a lower bound for the Balan--Jiang matrix problem. The construction is probabilistic.

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