Quantum channel tomography and estimation by local test

Abstract

We study the estimation of an unknown quantum channel E with input dimension d1, output dimension d2 and Kraus rank at most r. We establish a connection between the query complexities in two models: (i) access to E, and (ii) access to a random dilation of E. Specifically, we show that for parallel (possibly coherent) testers, access to dilations does not help. This is proved by constructing a local tester that uses n queries to E yet faithfully simulates the tester with n queries to a random dilation. As application, we show that: - O(rd1d2/2) queries to E suffice for channel tomography to within diamond norm error . Moreover, when rd2=d1, we show that the Heisenberg scaling O(1/) can be achieved, even if E is not a unitary channel: - O(\d12.5/,d12/2\) queries to E suffice for channel tomography to within diamond norm error , and O(d12/) queries suffice for the case of Choi state trace norm error . - O(\d11.5/,d1/2\) queries to E suffice for tomography of the mixed state E(|0 0|) to within trace norm error .

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