The complexity of positive semidefinite matrix factorization
Abstract
Let A be a matrix with nonnegative real entries. The PSD rank of A is the smallest integer k for which there exist k× k real PSD matrices B1,…,Bm, C1,…,Cn satisfying A(i|j)=tr(BiCj) for all i,j. This paper determines the computational complexity status of the PSD rank. Namely, we show that the problem of computing this function is polynomial-time equivalent to the existential theory of the reals.
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