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Quantum solvability of noisy linear problems by divide-and-conquer strategy

Quantum Physics 2022-03-14 v8

Abstract

Noisy linear problems have been studied in various science and engineering disciplines. A class of "hard" noisy linear problems can be formulated as follows: Given a matrix A^\hat{A} and a vector b\mathbf{b} constructed using a finite set of samples, a hidden vector or structure involved in b\mathbf{b} is obtained by solving a noise-corrupted linear equation A^xb+η\hat{A}\mathbf{x} \approx \mathbf{b} + \boldsymbol\eta, where η\boldsymbol\eta is a noise vector that cannot be identified. For solving such a noisy linear problem, we consider a quantum algorithm based on a divide-and-conquer strategy, wherein a large core process is divided into smaller subprocesses. The algorithm appropriately reduces both the computational complexities and size of a quantum sample. More specifically, if a quantum computer can access a particular reduced form of the quantum samples, polynomial quantum-sample and time complexities are achieved in the main computation. The size of a quantum sample and its executing system can be reduced, e.g., from exponential to sub-exponential with respect to the problem length, which is better than other results we are aware. We analyse the noise model conditions for such a quantum advantage, and show when the divide-and-conquer strategy can be beneficial for quantum noisy linear problems.

Keywords

Cite

@article{arxiv.1908.06229,
  title  = {Quantum solvability of noisy linear problems by divide-and-conquer strategy},
  author = {Wooyeong Song and Youngrong Lim and Kabgyun Jeong and Yun-Seong Ji and Jinhyoung Lee and Jaewan Kim and M. S. Kim and Jeongho Bang},
  journal= {arXiv preprint arXiv:1908.06229},
  year   = {2022}
}

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published version

R2 v1 2026-06-23T10:49:39.487Z