Better bound on the exponent of the radius of the multipartite separable ball

Abstract

We show that for an m-qubit quantum system, there is a ball of radius asymptotically approaching kappa 2-gamma m in Frobenius norm, centered at the identity matrix, of separable (unentangled) positive semidefinite matrices, for an exponent gamma = (1/2)((ln 3/ln 2) - 1), roughly .29248125. This is much smaller in magnitude than the best previously known exponent, from our earlier work, of 1/2. For normalized m-qubit states, we get a separable ball of radius sqrt(3(m+1)/(3m+3)) * 2-(1 + γ)m, i.e. sqrt3m+1/(3m+3)× 6-m/2 (note that = 3), compared to the previous 2 * 2-3m/2. This implies that with parameters realistic for current experiments, NMR with standard pseudopure-state preparation techniques can access only unentangled states if 36 qubits or fewer are used (compared to 23 qubits via our earlier results). We also obtain an improved exponent for m-partite systems of fixed local dimension d0, although approaching our earlier exponent as d0 approaches infinity.

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