Speedup of iterated quantum search by parallel performance
量子物理
2007-05-23 v4
摘要
Given a sequence f1(x1),f2(x1,x2),...,fk(x1,...,xk) of Boolean functions, each of which fi takes the value 1 in a single point of the form x10,x20,...,xi0,i=1,2,...,k. A length of all xi0 is n,N=2n. It is shown how to find xk0(k≥2) using \frac{k\pi\sqrt{N}}{4\sqrt{2}}simultaneousevaluationsoffunctionsoftheformf_i, f_{i+1}withanerrorprobabilityoforderk/\sqrt{N}whichis\sqrt{2}timesasfastasbytheksequentialapplicationsofGroveralgorithmforthequantumsearch.Evolutionsofamplitudesinparallelquantumcomputationsareapproximatedbysystemsoflineardifferentialequations.Someadvantageofsimultaneousevaluationsofallf_1 ,... f_k$ are discussed.
引用
@article{arxiv.quant-ph/9904039,
title = {Speedup of iterated quantum search by parallel performance},
author = {Yuri Ozhigov},
journal= {arXiv preprint arXiv:quant-ph/9904039},
year = {2007}
}
备注
Latex, 21 pages, no figures, simplification of the proof