Asymptotically optimal unitary estimation in SU(3) by the analysis of graph Laplacian

Abstract

Unitary estimation is the task to estimate an unknown unitary operator U∈SU(d) with n queries to the corresponding unitary operation, and its accuracy is evaluated by an estimation fidelity. We show that the optimal asymptotic fidelity of 3-dimensional unitary estimation is given by Fest(n,d=3) = 1-56π29n2 + O(n-3) by the analysis of the graph Laplacian based on the finite element method. We also show the lower bound on the fidelity of d-dimensional unitary estimation for an arbitrary d given by Fest(n,d) ≥ 1- (d+1)(d-1)(3d-2)(3d-1)6n2 + O(n-3) achieving the best known lower bound and tight scaling with respect to n and d. This lower bound is derived based on the unitary estimation protocol shown in [J. Kahn, Phys. Rev. A 75, 022326, 2007].