A Simple and Computationally Trivial Estimator for Grouped Fixed Effects Models
Abstract
This paper introduces a new fixed effects estimator for linear panel data models with clustered time patterns of unobserved heterogeneity. The method avoids non-convex and combinatorial optimization by combining a preliminary consistent estimator of the slope coefficient, an agglomerative pairwise-differencing clustering of cross-sectional units, and a pooled ordinary least squares regression. Asymptotic guarantees are established in a framework where can grow at any power of , as both and approach infinity. Unlike most existing approaches, the proposed estimator is computationally straightforward and does not require a known upper bound on the number of groups. As existing approaches, this method leads to a consistent estimation of well-separated groups and an estimator of common parameters asymptotically equivalent to the infeasible regression controlling for the true groups. An application revisits the statistical association between income and democracy.
Keywords
Cite
@article{arxiv.2203.08879,
title = {A Simple and Computationally Trivial Estimator for Grouped Fixed Effects Models},
author = {Martin Mugnier},
journal= {arXiv preprint arXiv:2203.08879},
year = {2025}
}