Support-based lower bounds for the positive semidefinite rank of a nonnegative matrix
Abstract
The positive semidefinite rank of a nonnegative (m× n)-matrix~S is the minimum number~q such that there exist positive semidefinite (q× q)-matrices A1,…,Am, B1,…,Bn such that S(k,) = tr(Ak* B). The most important, lower bound technique for nonnegative rank is solely based on the support of the matrix S, i.e., its zero/non-zero pattern. In this paper, we characterize the power of lower bounds on positive semidefinite rank based on solely on the support.
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