Random Batch Methods (RBM) for interacting particle systems

Abstract: We develop Random Batch Methods for interacting particle systems with large number of particles. These methods use small but random batches for particle interactions, thus the computational cost is reduced from O(N 2 ) per time step to O(N ), for a system with N particles with binary interactions. On one hand, these methods are efficient Asymptotic-Preserving schemes for the underlying particle systems, allowing N -independent time steps and also capture, in the N → ∞ limit, the solution of the mean field limi… Show more

“…The overall cost of the above simple algorithm is O(M N ), clearly for M = N we obtain the explicit Euler scheme for the original N particle system. As shown in 64,143 the convergence rate with respect to the original particle system is in fact…”

Vehicular traffic, crowds, and swarms: From kinetic theory and multiscale methods to applications and research perspectives

“…The overall cost of the above simple algorithm is O(M N ), clearly for M = N we obtain the explicit Euler scheme for the original N particle system. As shown in 64,143 the convergence rate with respect to the original particle system is in fact…”

Vehicular traffic, crowds, and swarms: From kinetic theory and multiscale methods to applications and research perspectives

“…To reduce the cost of evaluating the two-body interactions, the RBM proceeds as follows (this corresponds to the RBM with replacement in [23]): At each step, one randomly picks out two particles, i and j, and compute their interactions, ∇ r i u(|r i −r j |), then updates their positions as follows,…”

“…We now turn to the random batch algorithm (2.16) with replacement [23]. The convergence property has recently been proved in [22]: Theorem 2.1.…”

“…The presence of the Jastrow factor further complicates the computation. To alleviate the computational cost, we propose a random batch method (RBM), originated from emerging machine learning algorithms [4,6,48], and recently introduced to classical interacting particle systems in [23] and extended to various applications in both classical and quantum N-body systems [15,21,22,28,[30][31][32]. In particular, [23] established an error of RBM to be of O( √ ∆t), where ∆t is the time step, uniformly in N. For the present problem, the objective is to use such an idea to quickly relax the quantum system and sample the energy in the VMC method.…”

Random Batch Algorithms for Quantum Monte Carlo Simulations

“…Thanks to this approach we have an efficient algorithm for transport and interaction in the phase space and we can reconstruct the expected solution from the particle system from positions and velocities at the microscopic level, which is considered in the SG-gPC setting as in Section 3.2.1. This approach has been recently analysed in connection to other problems in [36]. for n = 0 to T − 1…”

Monte Carlo gPC Methods for Diffusive Kinetic Flocking Models with Uncertainties