Quantum search for unknown number of target items hybridizing the fixed-point method with the trail-and-error method

TL;DR

This paper introduces a hybrid quantum search algorithm combining fixed-point and trial-and-error methods, achieving optimal query complexity without randomness and improving efficiency over previous algorithms.

Contribution

It presents the first hybrid quantum search algorithm that optimally combines fixed-point and trial-and-error techniques, reducing query complexity and eliminating randomness.

Findings

Achieves optimal query complexity in or quantum search.

Reduces query complexity by about one-third compared to deterministic algorithms.

Provides a new approach for fixed-point and trial-and-error quantum search methods.

Abstract

For the unsorted database quantum search with the unknown fraction $\lambda$ of target items, there are mainly two kinds of methods, i.e., fixed-point or trail-and-error. (i) In terms of the fixed-point method, Yoder et al. [Phys. Rev. Lett. 113, 210501 (2014)] claimed that the quadratic speedup over classical algorithms has been achieved. However, in this paper, we point out that this is not the case, because the query complexity of Yoder's algorithm is actually in $O(1/\sqrt{\lambda_0})$ rather than $O(1/\sqrt{\lambda})$, where $\lambda_0$ is a known lower bound of $\lambda$. (ii) In terms of the trail-and-error method, currently the algorithm without randomness has to take more than 1 times queries or iterations than the algorithm with randomly selected parameters. For the above problems, we provide the first hybrid quantum search algorithm based on the fixed-point and trail-and-error methods, where the matched multiphase Grover operations are trialed multiple times and the number of iterations increases exponentially along with the number of trials. The upper bound of expected queries as well as the optimal parameters are derived. Compared with Yoder's algorithm, the query complexity of our algorithm indeed achieves the optimal scaling in $\lambda$ for quantum search, which reconfirms the practicality of the fixed-point method. In addition, our algorithm also does not contain randomness, and compared with the existing deterministic algorithm, the query complexity can be reduced by about 1/3. Our work provides an new idea for the research on fixed-point and trial-and-error quantum search.