English

A Quantum Algorithm for Solving Linear Differential Equations: Theory and Experiment

Quantum Physics 2020-03-11 v1
Authors: Tao Xin , Shijie Wei , Jianlian Cui , Junxiang Xiao , Iñigo Arrazola , Lucas Lamata , Xiangyu Kong , Dawei Lu , Enrique Solano , Guilu Long
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Abstract

We present and experimentally realize a quantum algorithm for efficiently solving the following problem: given an N×NN\times N matrix M\mathcal{M}, an NN-dimensional vector b\textbf{\emph{b}}, and an initial vector x(0)\textbf{\emph{x}}(0), obtain a target vector x(t)\textbf{\emph{x}}(t) as a function of time tt according to the constraint dx(t)/dt=Mx(t)+bd\textbf{\emph{x}}(t)/dt=\mathcal{M}\textbf{\emph{x}}(t)+\textbf{\emph{b}}. We show that our algorithm exhibits an exponential speedup over its classical counterpart in certain circumstances. In addition, we demonstrate our quantum algorithm for a 4×44\times4 linear differential equation using a 4-qubit nuclear magnetic resonance quantum information processor. Our algorithm provides a key technique for solving many important problems which rely on the solutions to linear differential equations.

Keywords

quantum algorithms quantum search algorithms quantum machine learning

Cite

@article{arxiv.1807.04553,
  title  = {A Quantum Algorithm for Solving Linear Differential Equations: Theory and Experiment},
  author = {Tao Xin and Shijie Wei and Jianlian Cui and Junxiang Xiao and Iñigo Arrazola and Lucas Lamata and Xiangyu Kong and Dawei Lu and Enrique Solano and Guilu Long},
  journal= {arXiv preprint arXiv:1807.04553},
  year   = {2020}
}

Comments

12 pages, 5 figures, and all comments are welcome!

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