| Literature DB >> 30662101 |
Alexander R Luedtke1, Mark J van der Laan1.
Abstract
We consider challenges that arise in the estimation of the mean outcome under an optimal individualized treatment strategy defined as the treatment rule that maximizes the population mean outcome, where the candidate treatment rules are restricted to depend on baseline covariates. We prove a necessary and sufficient condition for the pathwise differentiability of the optimal value, a key condition needed to develop a regular and asymptotically linear (RAL) estimator of the optimal value. The stated condition is slightly more general than the previous condition implied in the literature. We then describe an approach to obtain root-n rate confidence intervals for the optimal value even when the parameter is not pathwise differentiable. We provide conditions under which our estimator is RAL and asymptotically efficient when the mean outcome is pathwise differentiable. We also outline an extension of our approach to a multiple time point problem. All of our results are supported by simulations.Entities:
Keywords: Efficient estimator; Primary 62G05; non-regular inference; online estimation; optimal treatment; optimal value; pathwise differentiability; secondary 62N99; semi parametric model
Year: 2016 PMID: 30662101 PMCID: PMC6338452 DOI: 10.1214/15-AOS1384
Source DB: PubMed Journal: Ann Stat ISSN: 0090-5364 Impact factor: 4.028