Random Quantum Circuits and Pseudo-Random Operators: Theory and Applications
Abstract
Pseudo-random operators consist of sets of operators that exhibit many of the important statistical features of uniformly distributed random operators. Such pseudo-random sets of operators are most useful whey they may be parameterized and generated on a quantum processor in a way that requires exponentially fewer resources than direct implementation of the uniformly random set. Efficient pseudo-random operators can overcome the exponential cost of random operators required for quantum communication tasks such as super-dense coding of quantum states and approximately secure quantum data-hiding, and enable efficient stochastic methods for noise estimation on prototype quantum processors. This paper summarizes some recently published work demonstrating a random circuit method for the implementation of pseudo-random unitary operators on a quantum processor [Emerson et al., Science 302:2098 (Dec.~19, 2003)], and further elaborates the theory and applications of pseudo-random states and operators.
Cite
@article{arxiv.quant-ph/0410087,
title = {Random Quantum Circuits and Pseudo-Random Operators: Theory and Applications},
author = {Joseph Emerson},
journal= {arXiv preprint arXiv:quant-ph/0410087},
year = {2009}
}
Comments
This paper is a synopsis of Emerson et al., Science 302: 2098 (Dec 19, 2003) and some related unpublished work; it is based on a talk given at QCMC04; 4 pages, 1 figure, aipproc.sty