New Bounds and Truncation Boundaries for Importance Sampling

Importance sampling (IS) is a technique that enables statistical estimation of output performance at multiple input distributions from a single nominal input distribution. IS is commonly used in Monte Carlo simulation for variance reduction and in machine learning applications for reusing historical data, but its effectiveness can be challenging to quantify. In this work, we establish a new result showing the tightness of polynomial concentration bounds for classical IS likelihood ratio (LR) estimators in certain settings. Then, to address a practical statistical challenge that IS faces regarding potentially high variance, we propose new truncation boundaries when using a truncated LR estimator, for which we establish upper concentration bounds that imply an exponential convergence rate. Simulation experiments illustrate the contrasting convergence rates of the various LR estimators and the effectiveness of the newly proposed truncation-boundary LR estimators for examples from finance and machine learning.