Lower Bounds for Function Inversion with Quantum Advice

Kai-Min Chung, Tai-Ning Liao, Luowen Qian
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引用次数: 13

Abstract

Function inversion is the problem that given a random function $f: [M] \to [N]$, we want to find pre-image of any image $f^{-1}(y)$ in time $T$. In this work, we revisit this problem under the preprocessing model where we can compute some auxiliary information or advice of size $S$ that only depends on $f$ but not on $y$. It is a well-studied problem in the classical settings, however, it is not clear how quantum algorithms can solve this task any better besides invoking Grover's algorithm, which does not leverage the power of preprocessing. Nayebi et al. proved a lower bound $ST^2 \ge \tilde\Omega(N)$ for quantum algorithms inverting permutations, however, they only consider algorithms with classical advice. Hhan et al. subsequently extended this lower bound to fully quantum algorithms for inverting permutations. In this work, we give the same asymptotic lower bound to fully quantum algorithms for inverting functions for fully quantum algorithms under the regime where $M = O(N)$. In order to prove these bounds, we generalize the notion of quantum random access code, originally introduced by Ambainis et al., to the setting where we are given a list of (not necessarily independent) random variables, and we wish to compress them into a variable-length encoding such that we can retrieve a random element just using the encoding with high probability. As our main technical contribution, we give a nearly tight lower bound (for a wide parameter range) for this generalized notion of quantum random access codes, which may be of independent interest.
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用量子通知函数反演的下界
函数反转的问题是给定一个随机函数$f: [M] \to [N]$,我们想要找到任意图像$f^{-1}(y)$在时间$T$的预图像。在这项工作中,我们在预处理模型下重新审视了这个问题,我们可以计算一些辅助信息或大小为$S$的建议,这些信息只依赖于$f$而不依赖于$y$。在经典环境下,这是一个研究得很好的问题,然而,除了调用Grover算法之外,量子算法如何更好地解决这个任务还不清楚,Grover算法没有利用预处理的能力。Nayebi等人证明了量子算法反转排列的下界$ST^2 \ge \tilde\Omega(N)$,然而,他们只考虑具有经典建议的算法。Hhan等人随后将这个下界扩展到反转排列的全量子算法。在此工作中,我们给出了相同的全量子算法的渐近下界,用于反演函数的全量子算法在$M = O(N)$。为了证明这些界限,我们将最初由Ambainis等人引入的量子随机访问码的概念推广到给定一组(不一定是独立的)随机变量的设置,并且我们希望将它们压缩成可变长度的编码,以便我们可以使用高概率编码检索随机元素。作为我们的主要技术贡献,我们给出了量子随机接入码的广义概念的近紧下界(对于宽参数范围),这可能是独立的兴趣。
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