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arxiv: 2201.06605 · v2 · pith:FBZ37X4Onew · submitted 2022-01-17 · 💰 econ.EM · stat.ML

Inferential Theory for Granular Instrumental Variables in High Dimensions

classification 💰 econ.EM stat.ML
keywords errorfactorsstructuralasymptoticdimensionsdistributionextendgranular
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The Granular Instrumental Variables (GIV) methodology exploits panels with factor error structures to construct instruments to estimate structural time series models with endogeneity even after controlling for latent factors. We extend the GIV methodology in several dimensions. First, we extend the identification procedure to a large $N$ and large $T$ framework, which depends on the asymptotic Herfindahl index of the size distribution of $N$ cross-sectional units. Second, we treat both the factors and loadings as unknown and show that the sampling error in the estimated instrument and factors is negligible when considering the limiting distribution of the structural parameters. Third, we show that the sampling error in the high-dimensional precision matrix is negligible in our estimation algorithm. Fourth, we overidentify the structural parameters with additional constructed instruments, which leads to efficiency gains. Monte Carlo evidence is presented to support our asymptotic theory and application to the global crude oil market leads to new results.

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Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Granular Instrumental Variables in Large Panels: Identification and Inference Across Strong, Nearly Weak, and Weak GIV

    econ.EM 2026-07 unverdicted novelty 7.0

    Formalizes three regimes of GIV instrument strength in large panels and derives consistency, rates, and inference rules for strong, nearly weak, and weak cases.