Exact Testing of Many Moment Inequalities Against Multiple Violations

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Exact Testing of Many Moment Inequalities Against Multiple Violations

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Nick Koning
Paul Bekker

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Abstract

This paper considers the problem of testing many moment inequalities, where the number of moment inequalities ($p$) is possibly larger than the sample size ($n$). Chernozhukov et al. (2019) proposed asymptotic tests for this problem using the maximum $t$ statistic. We observe that such tests can have low power if multiple inequalities are violated. As an alternative, we propose novel randomization tests based on a maximum non-negatively weighted combination of $t$ statistics. We provide a condition guaranteeing size control in large samples. Simulations show that the tests control size in small samples ($n = 30$, $p = 1000$), and often has substantially higher power against alternatives with multiple violations than tests based on the maximum $t$ statistic.

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Nick Koning & Paul Bekker, 2019. "Exact Testing of Many Moment Inequalities Against Multiple Violations," Papers 1904.12775, arXiv.org, revised Jun 2020.

Handle: RePEc:arx:papers:1904.12775

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Andrews, Donald W.K. & Guggenberger, Patrik, 2009. "Validity Of Subsampling And “Plug-In Asymptotic” Inference For Parameters Defined By Moment Inequalities," Econometric Theory, Cambridge University Press, vol. 25(3), pages 669-709, June.
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repec:cwl:cwldpp:1840rr is not listed on IDEAS
Canay, Ivan A., 2010. "EL inference for partially identified models: Large deviations optimality and bootstrap validity," Journal of Econometrics, Elsevier, vol. 156(2), pages 408-425, June.

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Cited by:

Victor Chernozhukov & Denis Chetverikov & Kengo Kato & Yuta Koike, 2019. "Improved Central Limit Theorem and bootstrap approximations in high dimensions," Papers 1912.10529, arXiv.org, revised May 2022.

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Exact Testing of Many Moment Inequalities Against Multiple Violations

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