Orthogonal Machine Learning for Demand Estimation: High Dimensional Causal Inference in Dynamic Panels
There has been growing interest in how economists can import machine learning tools designed for prediction to facilitate, optimize and automate the model selection process, while still retaining desirable inference properties for causal parameters. Focusing on partially linear models, we extend the Double ML framework to allow for (1) a number of treatments that may grow with the sample size and (2) the analysis of panel data under sequentially exogenous errors. Our low-dimensional treatment (LD) regime directly extends the work in Chernozhukov et al. (2016), by showing that the coefficients from a second stage, ordinary least squares estimator attain root-n convergence and desired coverage even if the dimensionality of treatment is allowed to grow at a rate of O(N/ log N ). Additionally we consider a high-dimensional sparse (HDS) regime in which we show that second stage orthogonal LASSO and debiased orthogonal LASSO have asymptotic properties equivalent to oracle estimators with known first stage estimators. We argue that these advances make Double ML methods a desirable alternative for practitioners estimating short-term demand elasticities in non-contractual settings.
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