Sample complexity of hidden subgroup problem

Abstract

The hidden subgroup problem (HSP) 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 HSP 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 HSP seems to be absent, which will thus be the topic in this paper. HSP over a finite group is defined as follows: For a finite group G and a finite set V, given a function f:G V and the promise that for any x, y ∈ G, f(x) = f(xy) iff y ∈ H for a subgroup H ∈ H, where H is a set of candidate subgroups of G, the goal is to identify H. Our contributions are as follows: For HSP, we give the upper and lower bounds on the sample complexity of HSP. 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 (GSP), a special case of HSP, and show that the sample complexity of GSP is (\k,k· pn-k\). Thus we obtain a complete characterization of the sample complexity of GSP.