Estimating Fidelity to a Reference Quantum State

Abstract

We consider the problem of estimating the fidelity of an unknown quantum state to a known reference state to within additive error . We show that the sample complexity is O(r2/2) with optimal -dependence when the reference state is of rank r, improving the previous best O(r22(1/)/4) due to Utsumi, Nakata, Wang, and Takagi (QIP 2026). We also provide a lower bound of Ω(r/2), improving the previous best Ω(r/+1/2), with implications to quantum query complexity. Moreover, we further consider the case where the unknown state is of rank at most r while the reference state can be arbitrary, for which the sample complexity is shown to be O(r2/4). As an application, we present an approach to tolerant quantum state certification, generalizing the exact certification studied in Bădescu, O'Donnell, and Wright (STOC 2019).