Litcius/Paper detail

Near-Optimal A-B Testing

Nikhil Bhat, Vivek F. Farias, Ciamac C. Moallemi, Deeksha Sinha

2020Management Science45 citationsDOIOpen Access PDF

Abstract

We consider the problem of A-B testing when the impact of the treatment is marred by a large number of covariates. Randomization can be highly inefficient in such settings, and thus we consider the problem of optimally allocating test subjects to either treatment with a view to maximizing the precision of our estimate of the treatment effect. Our main contribution is a tractable algorithm for this problem in the online setting, where subjects arrive, and must be assigned, sequentially, with covariates drawn from an elliptical distribution with finite second moment. We further characterize the gain in precision afforded by optimized allocations relative to randomized allocations, and show that this gain grows large as the number of covariates grows. Our dynamic optimization framework admits several generalizations that incorporate important operational constraints such as the consideration of selection bias, budgets on allocations, and endogenous stopping times. In a set of numerical experiments, we demonstrate that our method simultaneously offers better statistical efficiency and less selection bias than state-of-the-art competing biased coin designs. This paper was accepted by Noah Gans, stochastic models and simulation.

Topics & Concepts

Selection (genetic algorithm)CovariateComputer scienceMathematical optimizationSet (abstract data type)Moment (physics)Sequential analysisStatistical hypothesis testingDistribution (mathematics)MathematicsStatisticsArtificial intelligenceMachine learningClassical mechanicsPhysicsMathematical analysisProgramming languageStatistical Methods in Clinical TrialsAdvanced Bandit Algorithms ResearchStatistical Methods and Inference