Physical Implementability for Reversible Magic State Manipulation
Abstract
Magic states are essential for achieving universal quantum computation. This study introduces a reversible framework for the manipulation of magic states in odd dimensions, delineating a necessary and sufficient condition for the exact transformations between magic states under maps that preserve the trace of states and positivity of discrete Wigner representation. Utilizing the stochastic formalism, we demonstrate that magic mana emerges as the unique measure for such reversible magic state transformations. We propose the concept of physical implementability for characterizing the hardness and cost of maintaining reversibility. Our findings show that, analogous to the entanglement theory, going beyond the positivity constraint enables an exact reversible theory of magic manipulation, thereby hinting at a potential incongruity between the reversibility of quantum resources and the fundamental principles of quantum mechanics. Physical implementability for reversible manipulation provides a new perspective for understanding and quantifying quantum resources, contributing to an operational framework for understanding the cost of reversible quantum resource manipulation.
Cite
@article{arxiv.2405.17356,
title = {Physical Implementability for Reversible Magic State Manipulation},
author = {Yu-Ao Chen and Gilad Gour and Xin Wang and Lei Zhang and Chenghong Zhu},
journal= {arXiv preprint arXiv:2405.17356},
year = {2024}
}
Comments
14 pages including appendix