Optimal sup-norm rates and uniform inference on nonlinear functionals of nonparametric IV regression

Chen, Xiaohong; Christensen, Timothy

doi:10.1920/wp.cem.2017.0917

Cited by 17 publications

(16 citation statements)

References 13 publications

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“…Alternatively, the functional form in Assumption 4 can be seen as a functional basis for the nonparametric estimation of ρ g (n) and g (n). Under this interpretation, our estimator is the sieve nonparametric instrumental variable (NPIV) estimator in Chen and Qiu (2016), Christensen (2018), andCompiani (2019). In this case, identification requires the assumption of completeness in Newey and Powell (2003) or, in the case of our model with a linear component, the weaker version of this assumption in Florens et al (2012).…”

Section: Estimating Moment Conditionsmentioning

confidence: 99%

“…In this section, we investigate the robustness of the baseline estimates of (n) and ρ(n) presented in Section 5.4. First, we implement the inference procedure in Chen and Christensen (2018) for the estimation of NPIV sieve estimators. Second, we show that results are similar when we use data for different years that have a similar country coverage.…”

Section: B4 Robustness Of Baseline Estimates In Section 54mentioning

confidence: 99%

“…In this section, we investigate the robustness of our standard estimates of (n) and ρ(n). We estimate standard errors with a criterion value estimated using the bootstrapped procedure in Chen and Christensen (2018). This method accounts for the fact that the function basis used in estimation are intended to approximate the true nonparametric functions (n) and ρ(n).…”

Section: B41 Alternative Inferencementioning

confidence: 99%

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Aggregate Implications of Firm Heterogeneity: A Nonparametric Analysis of Monopolistic Competition Trade Models

2020

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We measure the role of firm heterogeneity in counterfactual predictions of monopolistic competition trade models without parametric restrictions on the distribution of firm fundamentals. We show that two bilateral elasticity functions are sufficient to nonparametrically compute the counterfactual aggregate impact of trade shocks, and recover changes in economic fundamentals from observed data. These functions are identified from two semiparametric gravity equations governing the impact of bilateral trade costs on the extensive and intensive margins of firm-level exports. Applying our methodology, we estimate elasticity functions that imply an impact of trade costs on trade flows that falls when more firms serve a market because of smaller extensive margin responses. Compared to a baseline where elasticities are constant, firm heterogeneity amplifies both the gains from trade in countries with more exporter firms and the welfare gains of European market integration in 2003-2012.

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Section: Estimating Moment Conditionsmentioning

confidence: 99%

Section: B4 Robustness Of Baseline Estimates In Section 54mentioning

confidence: 99%

Section: B41 Alternative Inferencementioning

confidence: 99%

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Aggregate Implications of Firm Heterogeneity: A Nonparametric Analysis of Monopolistic Competition Trade Models

2020

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“…We investigate the following three functions for g(x): g 1 (x) = ln(|6x − 3| + 1)sgn(x − 1/2), g 2 (x) = sin(7πx/2) 1+2x 2 (sgn(x)+1) , and g 3 (x) = x − 1/2 + 5φ(10(x − 1/2)), where φ(•) is the standard normal probability density function, and sgn(•) is the sign function. g 1 (x) is used in Newey and Powell (2003), as well as Chen and Christensen (2018). g 2 (x) and g 3 (x) are rescaled versions used in Hall and Horowitz (2013).…”

Section: Simulationsmentioning

confidence: 99%

Inference in Nonparametric Series Estimation With Specification Searches for the Number of Series Terms

Kang

2020

Econom. Theory

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Nonparametric series regression often involves specification search over the tuning parameter, i.e., evaluating estimates and confidence intervals with a different number of series terms. This paper develops pointwise and uniform inferences for conditional mean functions in nonparametric series estimations that are uniform in the number of series terms. As a result, this paper constructs confidence intervals and confidence bands with possibly data-dependent series terms that have valid asymptotic coverage probabilities. This paper also considers a partially linear model setup and develops inference methods for the parametric part uniform in the number of series terms. The finite sample performance of the proposed methods is investigated in various simulation setups as well as in an illustrative example, i.e., the nonparametric estimation of the wage elasticity of the expected labor supply from Blomquist and Newey (2002).

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“…It is not surprising that such an inference method has been missing for long in the literature, given the technical difficulties of the problem. Deconvolution is an ill‐posed inverse problem, and inference under this problem is known to be challenging; see Bissantz et al (2007), Bissantz and Holzmann (2008), Lounici and Nickl (2011), Horowitz and Lee (2012), Hall and Horowitz (2013), Schmidt‐Hieber, Munk, and Dümbgen (2013), Chen and Christensen (2018), Kato and Sasaki (2018), Babii (2019), Kato and Sasaki (2019), Adusumilli et al (2020) for existing papers developing confidence bands in ill‐posed inverse problems for example. We take a robust inference approach à la Anderson and Rubin (1949), and directly work with the moment restrictions based on Kotlarski's identity.…”

Section: Introductionmentioning

confidence: 99%

Robust inference in deconvolution

Kato

Sasaki

Ura

2021

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Kotlarski's identity has been widely used in applied economic research based on repeated‐measurement or panel models with latent variables. However, how to conduct inference for these models has been an open question for two decades. This paper addresses this open problem by constructing a novel confidence band for the density function of a latent variable in repeated measurement error model. The confidence band builds on our finding that we can rewrite Kotlarski's identity as a system of linear moment restrictions. Our approach is robust in that we do not require the completeness. The confidence band controls the asymptotic size uniformly over a class of data generating processes, and it is consistent against all fixed alternatives. Simulation studies support our theoretical results.

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Optimal sup-norm rates and uniform inference on nonlinear functionals of nonparametric IV regression

Cited by 17 publications

References 13 publications

Aggregate Implications of Firm Heterogeneity: A Nonparametric Analysis of Monopolistic Competition Trade Models

Aggregate Implications of Firm Heterogeneity: A Nonparametric Analysis of Monopolistic Competition Trade Models

Inference in Nonparametric Series Estimation With Specification Searches for the Number of Series Terms

Robust inference in deconvolution

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