On the Need for Large Quantum Depth

Nai Hui Chia, Kai Min Chung, Ching Yi Lai

研究成果: Article同行評審

5 引文 斯高帕斯(Scopus)

摘要

Near-term quantum computers are likely to have small depths due to short coherence time and noisy gates. A natural approach to leverage these quantum computers is interleaving them with classical computers. Understanding the capabilities and limits of this hybrid approach is an essential topic in quantum computation. Most notably, the quantum Fourier transform can be implemented by a hybrid of logarithmic-depth quantum circuits and a classical polynomial-time algorithm. Therefore, it seems possible that quantum polylogarithmic depth is as powerful as quantum polynomial depth in the presence of classical computation. Indeed, Jozsa conjectured that "Any quantum polynomial-time algorithm can be implemented with only O(log n) quantum depth interspersed with polynomial-time classical computations."This can be formalized as asserting the equivalence of BQP and "BQNCBPP."However, Aaronson conjectured that "there exists an oracle separation between BQP and BPPBQNC."BQNCBPP and BPPBQNC are two natural and seemingly incomparable ways of hybrid classical-quantum computation.In this work, we manage to prove Aaronson's conjecture and in the meantime prove that Jozsa's conjecture, relative to an oracle, is false. In fact, we prove a stronger statement that for any depth parameter d, there exists an oracle that separates quantum depth d and 2d+1 in the presence of classical computation. Thus, our results show that relative to oracles, doubling the quantum circuit depth does make the hybrid model more powerful, and this cannot be traded by classical computation.

原文English
文章編號3570637
期刊Journal of the ACM
70
發行號1
DOIs
出版狀態Published - 16 1月 2023

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