Reversing Unknown Quantum Transformations: Universal Quantum Circuit for Inverting General Unitary Operations

Abstract

Given a quantum gate implementing a d-dimensional unitary operation Ud, without any specific description but d, and permitted to use k times, we present a universal probabilistic heralded quantum circuit that implements the exact inverse Ud-1, whose failure probability decays, exponentially in k. The protocol employs an adaptive strategy, proven necessary for the exponential performance. It requires k≥ d-1, proven necessary for exact implementation of Ud-1 with quantum circuits. Moreover, even when quantum circuits with indefinite causal order are allowed, k≥ d-1 uses are required. We then present a finite set of linear and positive semidefinite constraints characterizing universal unitary inversion protocols and formulate a convex optimization problem whose solution is the maximum success probability for given k and d. The optimal values are computed using semidefinite programming solvers for k≤ 3 when d=2 and k≤ 2 for d=3. With this numerical approach we show for the first time that indefinite causal order circuits provide an advantage over causally ordered ones in a task involving multiple uses of the same unitary operation.