中文

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)f_1 (x_1), f_2 (x_1, x_2), ..., f_k (x_1, ..., x_k) of Boolean functions, each of which fif_i takes the value 1 in a single point of the form x10,x20,...,xi0,i=1,2,...,kx_1^0, x_2^0, ..., x_i^0, i=1,2,..., k. A length of all xi0x_i^0 is n,N=2nn, N=2^n. It is shown how to find xk0(k2)x_k^0 (k\geq 2) using \frac{k\pi\sqrt{N}}{4\sqrt{2}}simultaneousevaluationsoffunctionsoftheform simultaneous evaluations of functions of the form f_i, f_{i+1}withanerrorprobabilityoforder with an error probability of order k/\sqrt{N}whichis which is \sqrt{2}timesasfastasbythe times as fast as by the ksequentialapplicationsofGroveralgorithmforthequantumsearch.Evolutionsofamplitudesinparallelquantumcomputationsareapproximatedbysystemsoflineardifferentialequations.Someadvantageofsimultaneousevaluationsofall sequential applications of Grover algorithm for the quantum search. Evolutions of amplitudes in parallel quantum computations are approximated by systems of linear differential equations. Some advantage of simultaneous evaluations of all f_1 ,... f_k$ are discussed.

关键词

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