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Inference for High-Dimensional Sparse Econometric Models

2 Pith papers cite this work. Polarity classification is still indexing.

2 Pith papers citing it
abstract

This article is about estimation and inference methods for high dimensional sparse (HDS) regression models in econometrics. High dimensional sparse models arise in situations where many regressors (or series terms) are available and the regression function is well-approximated by a parsimonious, yet unknown set of regressors. The latter condition makes it possible to estimate the entire regression function effectively by searching for approximately the right set of regressors. We discuss methods for identifying this set of regressors and estimating their coefficients based on $\ell_1$-penalization and describe key theoretical results. In order to capture realistic practical situations, we expressly allow for imperfect selection of regressors and study the impact of this imperfect selection on estimation and inference results. We focus the main part of the article on the use of HDS models and methods in the instrumental variables model and the partially linear model. We present a set of novel inference results for these models and illustrate their use with applications to returns to schooling and growth regression.

fields

stat.ME 2

years

2026 2

verdicts

UNVERDICTED 2

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representative citing papers

Learning a directed acyclic graph with additive heteroscedastic errors

stat.ME · 2026-05-26 · unverdicted · novelty 7.0

RESQUE recovers topological order and graph structure in DAGs with additive heteroscedastic errors via iterative residual construction and composite quantile regression, with theoretical guarantees even when dimension diverges with sample size.

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  • Learning a directed acyclic graph with additive heteroscedastic errors stat.ME · 2026-05-26 · unverdicted · none · ref 4 · internal anchor

    RESQUE recovers topological order and graph structure in DAGs with additive heteroscedastic errors via iterative residual construction and composite quantile regression, with theoretical guarantees even when dimension diverges with sample size.

  • High Dimensional Change Point Models for Two-Directional Data stat.ME · 2026-06-05 · unverdicted · none · ref 63 · internal anchor

    Develops methodology and asymptotic theory for single and multiple change point recovery in high-dimensional two-directional mean processes, with climate data application.