Sample complexity of hidden subgroup problem
Abstract
The hidden subgroup problem () has been attracting much attention in quantum computing, since several well-known quantum algorithms including Shor algorithm can be described in a uniform framework as quantum methods to address different instances of it. One of the central issues about is to characterize its quantum/classical complexity. For example, from the viewpoint of learning theory, sample complexity is a crucial concept. However, while the quantum sample complexity of the problem has been studied, a full characterization of the classical sample complexity of seems to be absent, which will thus be the topic in this paper. over a finite group is defined as follows: For a finite group and a finite set , given a function and the promise that for any iff for a subgroup , where is a set of candidate subgroups of , the goal is to identify . Our contributions are as follows: For , we give the upper and lower bounds on the sample complexity of . Furthermore, we have applied the result to obtain the sample complexity of some concrete instances of hidden subgroup problem. Particularly, we discuss generalized Simon's problem (), a special case of , and show that the sample complexity of is . Thus we obtain a complete characterization of the sample complexity of .
Keywords
Cite
@article{arxiv.2107.02987,
title = {Sample complexity of hidden subgroup problem},
author = {Zekun Ye and Lvzhou Li},
journal= {arXiv preprint arXiv:2107.02987},
year = {2021}
}