English

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

Quantum Physics 2020-04-16 v3

Abstract

Given a quantum gate implementing a dd-dimensional unitary operation UdU_d, without any specific description but dd, and permitted to use kk times, we present a universal probabilistic heralded quantum circuit that implements the exact inverse Ud1U_d^{-1}, whose failure probability decays, exponentially in kk. The protocol employs an adaptive strategy, proven necessary for the exponential performance. It requires kd1k\geq d-1, proven necessary for exact implementation of Ud1U_d^{-1} with quantum circuits. Moreover, even when quantum circuits with indefinite causal order are allowed, kd1k\geq 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 kk and dd. The optimal values are computed using semidefinite programming solvers for k3k\leq 3 when d=2d=2 and k2k\leq 2 for d=3d=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.

Keywords

Cite

@article{arxiv.1810.06944,
  title  = {Reversing Unknown Quantum Transformations: Universal Quantum Circuit for Inverting General Unitary Operations},
  author = {Marco Túlio Quintino and Qingxiuxiong Dong and Atsushi Shimbo and Akihito Soeda and Mio Murao},
  journal= {arXiv preprint arXiv:1810.06944},
  year   = {2020}
}

Comments

Closer to the published version. This version slightly improves the text and provides more details on the proof of Theorem 2. Part of the technical methods are presented at arXiv:1909.01366. Matlab code to accompany this article can be found at https://github.com/mtcq/unitary_inverse

R2 v1 2026-06-23T04:41:32.161Z