English

Debiased machine learning for combining probability and non-probability survey data

Methodology 2025-10-30 v2

Abstract

We consider the problem of estimating the finite population mean Yˉ\bar{Y} of an outcome variable YY using data from a nonprobability sample and auxiliary information from a probability sample. Existing double robust (DR) estimators of this mean Yˉ\bar{Y} require the estimation of two nuisance functions: the conditional probability of selection into the nonprobability sample given covariates XX that are observed in both samples, and the conditional expectation of YY given XX. These nuisance functions can be estimated using parametric models, but the resulting estimator of Yˉ\bar{Y} will typically be biased if both parametric models are misspecified. It would therefore be advantageous to be able to use more flexible data-adaptive / machine-learning estimators of the nuisance functions. Here, we develop a general framework for the valid use of DR estimators of Yˉ\bar{Y} when the design of the probability sample uses sampling without replacement at the first stage and data-adaptive / machine-learning estimators are used for the nuisance functions. We prove that several DR estimators of Yˉ\bar{Y}, including targeted maximum likelihood estimators, are asymptotically normally distributed when the estimators of the nuisance functions converge faster than the n1/4n^{1/4} rate and cross-fitting is used. We present a simulation study that demonstrates good performance of these DR estimators compared to the corresponding DR estimators that rely on at least one correctly specified parametric model.

Keywords

Cite

@article{arxiv.2508.08948,
  title  = {Debiased machine learning for combining probability and non-probability survey data},
  author = {Shaun Seaman},
  journal= {arXiv preprint arXiv:2508.08948},
  year   = {2025}
}

Comments

73 pages, 3 figures, 25 tables

R2 v1 2026-07-01T04:46:06.539Z