English

Distributional Instruments: Identification and Estimation with Quantile Least Squares

Econometrics 2026-02-12 v2 Statistics Theory Applications Statistics Theory

Abstract

We study instrumental-variable designs where policy reforms strongly shift the distribution of an endogenous variable but only weakly move its mean. We formalize this by introducing distributional relevance: instruments may be purely distributional. Within a triangular model, distributional relevance suffices for nonparametric identification of average structural effects via a control function. We then propose Quantile Least Squares (Q-LS), which aggregates conditional quantiles of X given Z into an optimal mean-square predictor and uses this projection as an instrument in a linear IV estimator. We establish consistency, asymptotic normality, and the validity of standard 2SLS variance formulas, and we discuss regularization across quantiles. Monte Carlo designs show that Q-LS delivers well-centered estimates and near-correct size when mean-based 2SLS suffers from weak instruments. In Health and Retirement Study data, Q-LS exploits Medicare Part D-induced distributional shifts in out-of-pocket risk to sharpen estimates of its effects on depression.

Keywords

Cite

@article{arxiv.2601.16865,
  title  = {Distributional Instruments: Identification and Estimation with Quantile Least Squares},
  author = {Rowan Cherodian and Guy Tchuente},
  journal= {arXiv preprint arXiv:2601.16865},
  year   = {2026}
}
R2 v1 2026-07-01T09:17:34.474Z