Gasteratos Ioannis, Salins Michael, Spiliopoulos Konstantinos
Department of Mathematics, Imperial College London, London, UK.
Department of Mathematics and Statistics, Boston University, Boston, USA.
Stoch Partial Differ Equ. 2024;12(4):2081-2150. doi: 10.1007/s40072-023-00320-x. Epub 2023 Dec 8.
We develop a provably efficient importance sampling scheme that estimates exit probabilities of solutions to small-noise stochastic reaction-diffusion equations from scaled neighborhoods of a stable equilibrium. The moderate deviation scaling allows for a local approximation of the nonlinear dynamics by their linearized version. In addition, we identify a finite-dimensional subspace where exits take place with high probability. Using stochastic control and variational methods we show that our scheme performs well both in the zero noise limit and pre-asymptotically. Simulation studies for stochastically perturbed bistable dynamics illustrate the theoretical results.
我们开发了一种可证明有效的重要性抽样方案,该方案可从稳定平衡点的缩放邻域估计小噪声随机反应扩散方程解的退出概率。适度偏差缩放允许通过其线性化版本对非线性动力学进行局部近似。此外,我们确定了一个有限维子空间,在该子空间中退出以高概率发生。使用随机控制和变分方法,我们表明我们的方案在零噪声极限和预渐近情况下都表现良好。对随机扰动双稳动力学的模拟研究说明了理论结果。
