Universal quantum computing and three-manifolds
Abstract
A single qubit may be represented on the Bloch sphere or similarly on the -sphere . Our goal is to dress this correspondence by converting the language of universal quantum computing (UQC) to that of -manifolds. A magic state and the Pauli group acting on it define a model of UQC as a positive operator-valued measure (POVM) that one recognizes to be a -manifold . More precisely, the -dimensional POVMs defined from subgroups of finite index of the modular group correspond to -fold - coverings over the trefoil knot. In this paper, one also investigates quantum information on a few "universal" knots and links such as the figure-of-eight knot, the Whitehead link and Borromean rings, making use of the catalog of platonic manifolds available on the software SnapPy. Further connections between POVMs based UQC and 's obtained from Dehn fillings are explored.
Cite
@article{arxiv.1802.04196,
title = {Universal quantum computing and three-manifolds},
author = {Michel Planat and Raymond Aschheim and Marcelo M. Amaral and Klee Irwin},
journal= {arXiv preprint arXiv:1802.04196},
year = {2019}
}
Comments
17 pages, 5 figures, 6 tables introduction much improved