English

Quantum Algorithm for Solving a Quadratic Nonlinear System of Equations

Quantum Physics 2022-10-11 v3

Abstract

Solving a quadratic nonlinear system of equations (QNSE) is a fundamental, but important, task in nonlinear science. We propose an efficient quantum algorithm for solving nn-dimensional QNSE. Our algorithm embeds QNSE into a finite-dimensional system of linear equations using the homotopy perturbation method and a linearization technique; then we solve the linear equations with a quantum linear system solver and obtain a state which is ϵ\epsilon-close to the normalized exact solution of the QNSE with success probability Ω(1)\Omega(1). The complexity of our algorithm is O(polylog(n/ϵ))O({\rm polylog}(n/\epsilon)), which provides an exponential improvement over the optimal classical algorithm in dimension nn, and the dependence on ϵ\epsilon is almost optimal. Therefore, our algorithm exponentially accelerates the solution of QNSE and has wide applications in all kinds of nonlinear problems, contributing to the research progress of nonlinear science.

Keywords

Cite

@article{arxiv.2112.01655,
  title  = {Quantum Algorithm for Solving a Quadratic Nonlinear System of Equations},
  author = {Cheng Xue and Xiao-Fan Xu and Yu-Chun Wu and Guo-Ping Guo},
  journal= {arXiv preprint arXiv:2112.01655},
  year   = {2022}
}

Comments

12 pages;

R2 v1 2026-06-24T08:02:34.030Z