The hidden subgroup problem (HSP) offers a unified framework to study problems of group-theoretical nature in quantum computing such as order finding and the discrete logarithm problem. While it is known that Fourier sampling provides an efficient solution in the abelian case, not much is known for general non-abelian groups. Recently, some authors raised the question as to whether post-processing the Fourier spectrum by measuring in a random orthonormal basis helps for solving the HSP. Several negative results on the shortcomings of this random strong method are known. In this paper however, we show that the random strong method can be quite powerful under certain conditions on the group G. We define a parameter r(G) and show that O((log ∣G∣/r(G))~2) iterations of the random strong method give enough classical information to solve the HSP. We illustrate the power of the random strong method via a concrete example of the HSP over finite Heisenberg groups. We show that r(G) = Ω(1) for these groups; hence the HSP can be solved using polynomially many random strong Fourier samplings followed by a possibly exponential classical post-processing without further queries. The quantum part of our algorithm consists of a polynomial computation followed by measuring in a random orthonormal basis. As an interesting by-product of our work, we get an algorithm for solving the state identification problem for a set of nearly orthogonal pure quantum states.
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机译:隐藏的子组问题(HSP)提供了一个统一的框架,以研究量子计算中的群体理论性质问题,例如订单查找和离散对数问题。虽然已知傅里叶采样在阿比海案中提供有效的解决方案,但对于一般非雅中组而言,并不多。最近,一些作者提出了通过以随机正常的基础测量来处理傅立叶光谱有助于解决HSP的问题。若干随机强度方法的几个负面结果是已知的。然而,在本文中,我们表明随机强的方法在组G的某些条件下可以非常强大。我们定义了参数R(g)并显示O((log | gie / r(g))〜2 “随机强的方法的迭代提供足够的经典信息来解决HSP。我们通过UniTite Heisenberg组的HSP的具体示例说明了随机强方法的力量。我们显示这些组的R(g)=ω(1);因此,可以使用多项式许多随机强的傅里叶采样来解决HSP,然后是可能是指数的经典后处理,而无需进一步查询。我们的算法的量子部分由多项式计算组成,然后以随机正常的基础测量。作为我们工作的一个有趣的副产品,我们获得了一种解决一组几乎正交的纯量子状态的状态识别问题的算法。
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