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Bibliographic Details
Main Authors: Mukherjee, Anirban, Chang, Hannah Hanwen
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2404.04979
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author Mukherjee, Anirban
Chang, Hannah Hanwen
author_facet Mukherjee, Anirban
Chang, Hannah Hanwen
contents Social science research often hinges on the relationship between categorical variables and outcomes. We introduce CAVIAR, a novel method for embedding categorical variables that assume values in a high-dimensional ambient space but are sampled from an underlying manifold. Our theoretical and numerical analyses outline challenges posed by such categorical variables in causal inference. Specifically, dynamically varying and sparse levels can lead to violations of the Donsker conditions and a failure of the estimation functionals to converge to a tight Gaussian process. Traditional approaches, including the exclusion of rare categorical levels and principled variable selection models like LASSO, fall short. CAVIAR embeds the data into a lower-dimensional global coordinate system. The mapping can be derived from both structured and unstructured data, and ensures stable and robust estimates through dimensionality reduction. In a dataset of direct-to-consumer apparel sales, we illustrate how high-dimensional categorical variables, such as zip codes, can be succinctly represented, facilitating inference and analysis.
format Preprint
id arxiv_https___arxiv_org_abs_2404_04979
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle CAVIAR: Categorical-Variable Embeddings for Accurate and Robust Inference
Mukherjee, Anirban
Chang, Hannah Hanwen
Econometrics
Machine Learning
Social science research often hinges on the relationship between categorical variables and outcomes. We introduce CAVIAR, a novel method for embedding categorical variables that assume values in a high-dimensional ambient space but are sampled from an underlying manifold. Our theoretical and numerical analyses outline challenges posed by such categorical variables in causal inference. Specifically, dynamically varying and sparse levels can lead to violations of the Donsker conditions and a failure of the estimation functionals to converge to a tight Gaussian process. Traditional approaches, including the exclusion of rare categorical levels and principled variable selection models like LASSO, fall short. CAVIAR embeds the data into a lower-dimensional global coordinate system. The mapping can be derived from both structured and unstructured data, and ensures stable and robust estimates through dimensionality reduction. In a dataset of direct-to-consumer apparel sales, we illustrate how high-dimensional categorical variables, such as zip codes, can be succinctly represented, facilitating inference and analysis.
title CAVIAR: Categorical-Variable Embeddings for Accurate and Robust Inference
topic Econometrics
Machine Learning
url https://arxiv.org/abs/2404.04979