Optimal lower bound for quantum channel tomography in away-from-boundary regime

Abstract

Consider quantum channels with input dimension d1, output dimension d2 and Kraus rank at most r. Any such channel must satisfy the constraint rd2≥ d1, and the parameter regime rd2=d1 is called the boundary regime. In this paper, we show an optimal query lower bound (rd1d2/2) for quantum channel tomography to within diamond norm error in the away-from-boundary regime rd2≥ 2d1, matching the existing upper bound O(rd1d2/2). In particular, this lower bound fully settles the query complexity for the commonly studied case of equal input and output dimensions d1=d2=d with r≥ 2, in sharp contrast to the unitary case r=1 where Heisenberg scaling (d2/) is achievable.