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The Random Batch Method for $N$-Body Quantum Dynamics

Analysis of PDEs 2019-12-17 v1 Numerical Analysis Mathematical Physics math.MP Numerical Analysis

Abstract

This paper discusses a numerical method for computing the evolution of large interacting system of quantum particles. The idea of the random batch method is to replace the total interaction of each particle with the N1N-1 other particles by the interaction with p<Np<N particles chosen at random at each time step, multiplied by (N1)/p(N-1)/p. This reduces the computational cost of computing the interaction partial per time step from O(N2)O(N^2) to O(N)O(N). For simplicity, we consider only in this work the case p=1p=1. In other words, we assume that NN is even, and that at each time step, the NN particles are organized in N/2N/2 pairs, with a random reshuffling of the pairs at the beginning of each time step. We obtain a convergence estimate for the Wigner transform of the single-particle reduced density matrix of the particle system at time tt that is uniform in N>1N>1 and independent of the Planck constant \hbar.

Keywords

Cite

@article{arxiv.1912.07424,
  title  = {The Random Batch Method for $N$-Body Quantum Dynamics},
  author = {François Golse and Shi Jin and Thierry Paul},
  journal= {arXiv preprint arXiv:1912.07424},
  year   = {2019}
}

Comments

23 pages

R2 v1 2026-06-23T12:47:10.582Z