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The absolute positive partial transpose property for random induced states

Published 9 Aug 2011 in math-ph, math.MP, math.PR, and quant-ph | (1108.1935v1)

Abstract: In this paper, we first obtain an algebraic formula for the moments of a centered Wishart matrix, and apply it to obtain new convergence results in the large dimension limit when both parameters of the distribution tend to infinity at different speeds. We use this result to investigate APPT (absolute positive partial transpose) quantum states. We show that the threshold for a bipartite random induced state on $\Cd=\C{d_1} \otimes \C{d_2}$, obtained by partial tracing a random pure state on $\Cd \otimes \Cs$, being APPT occurs if the environmental dimension $s$ is of order $s_0=\min(d_1, d_2)3 \max(d_1, d_2)$. That is, when $s \geq Cs_0$, such a random induced state is APPT with large probability, while such a random states is not APPT with large probability when $s \leq cs_0 $. Besides, we compute effectively $C$ and $c$ and show that it is possible to replace them by the same sharp transition constant when $\min(d_1, d_2){2}\ll d$.

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