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Journal of Business & Economic Statistics Volume 41, 2023 - Issue 3
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Articles

Empirical Likelihood and Uniform Convergence Rates for Dyadic Kernel Density Estimation

Harold D. Chianga Department of Economics, University of Wisconsin-Madison, Madison, WI;;Correspondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-3545-4710
ORCID Icon &
Bing Yang Tanb Global Asia Institute, National University of Singapore, Singapore, SingaporeORCID Iconhttps://orcid.org/0000-0001-8621-5923
ORCID Icon
Pages 906-914 | Published online: 05 Jul 2022

References

  • Akritas, M. G., and Van Keilegom, I. (2001), “Non-parametric Estimation of the Residual Distribution,” Scandinavian Journal of Statistics, 28, 549–567. DOI: 10.1111/1467-9469.00254.
  • Aronow, P. M., Samii, C., and Assenova, V. A. (2015), “Cluster–Robust Variance Estimation for Dyadic Data,” Political Analysis, 23, 564–577. DOI: 10.1093/pan/mpv018.
  • Bickel, P. J., Chen, A., and Levina, E. (2011), “The Method of Moments and Degree Distributions for Network Models,” Annals of Statistics, 39, 2280–2301.
  • Bravo, F., Escanciano, J. C., and Van Keilegom, I. (2020), “Two-Step Semiparametric Empirical Likelihood Inference,” Annals of Statistics, 48, 1–26.
  • Calonico, S., Cattaneo, M. D., and Farrell, M. H. (2018), “On the Effect of Bias Estimation on Coverage Accuracy in Nonparametric Inference,” Journal of the American Statistical Association, 113, 767–779. DOI: 10.1080/01621459.2017.1285776.
  • Cameron, A. C., and D. L. Miller (2014), “Robust Inference for Dyadic Data,” Unpublished manuscript, University of California-Davis.
  • Cattaneo, M., Feng, Y., and Underwood, W. (2022), “Uniform Inference for Kernel Density Estimators with Dyadic Data,” preprint.
  • Cattaneo, M. D., Crump, R. K., and Jansson, M. (2013), “Generalized Jackknife Estimators of Weighted Average Derivatives,” Journal of the American Statistical Association, 108, 1243–1256. DOI: 10.1080/01621459.2012.745810.
  • Cattaneo, M. D., Crump, R. K., and Jansson, M. (2014a), “Bootstrapping Density-Weighted Average Derivatives,” Econometric Theory, 30, 1135–1164.
  • Cattaneo, M. D., Crump, R. K., and Jansson, M. (2014b), “Small Bandwidth Asymptotics for Density-Weighted Average Derivatives,” Econometric Theory, 30, 176–200.
  • Cattaneo, M. D., Jansson, M., and Ma, X. (2020a), “Local Regression Distribution Estimators,” working paper.
  • Cattaneo, M. D., Jansson, M., and Ma, X. (2020b), “Simple Local Polynomial Density Estimators,” Journal of the American Statistical Association, 115, 1449–1455. DOI: 10.1080/01621459.2019.1635480.
  • Cattaneo, M. D., Jansson, M., and Newey, W. K. (2018a), “Alternative Asymptotics and the Partially Linear Model with Many Regressors,” Econometric Theory, 34, 277–301. DOI: 10.1017/S026646661600013X.
  • Cattaneo, M. D., Jansson, M., and Newey, W. K. (2018b), “Inference in Linear Regression Models with Many Covariates and Heteroscedasticity,” Journal of the American Statistical Association, 113, 1350–1361.
  • Chen, R., and Tabri, R. V. (2020), “Jackknife Empirical Likelihood for Inequality Constraints on Regular Functionals,” Journal of Econometrics, 221, 68–77. DOI: 10.1016/j.jeconom.2019.11.007.
  • Chen, S. X., and Van Keilegom, I. (2009), “A Review on Empirical Likelihood Methods for Regression,” Test, 18, 415–447. DOI: 10.1007/s11749-009-0159-5.
  • Chiang, H. D., Kato, K., and Sasaki, Y. (2020), “Inference for High-Dimensional Exchangeable Arrays,” arXiv preprint arXiv:2009.05150.
  • Davezies, L., D’Haultfoeuille, X., and Guyonvarch, Y. (2021), “Empirical Process Results for Exchangeable Arrays,” Annals of Statistics, 49, 845–862.
  • Dony, J., and Mason, D. M. (2008), “Uniform in Bandwidth Consistency of Conditional U-Statistics,” Bernoulli, 14, 1108–1133. DOI: 10.3150/08-BEJ136.
  • Efron, B., and Stein, C. (1981), “The Jackknife Estimate of Variance,” Annals of Statistics, 9, 586–596.
  • Einmahl, U., and Mason, D. M. (2000), “An Empirical Process Approach to the Uniform Consistency of Kernel-Type Function Estimators,” Journal of Theoretical Probability, 13, 1–37.
  • Einmahl, U., and Mason, D. M. (2005), “Uniform in Bandwidth Consistency of Kernel-Type Function Estimators,” Annals of Statistics, 33, 1380–1403.
  • Escanciano, J. C., and Jacho-Chávez, D. T. (2012), “n-Uniformly Consistent Density Estimation in Nonparametric Regression Models,” Journal of Econometrics, 167, 305–316.
  • Fafchamps, M., and Gubert, F. (2007), “The Formation of Risk Sharing Networks,” Journal of Development Economics, 83, 326–350. DOI: 10.1016/j.jdeveco.2006.05.005.
  • Frank, O., and Snijders, T. (1994), “Estimating the Size of Hidden Populations Using Snowball Sampling,” Journal of Official Statistics, 10, 53–53.
  • Gong, Y., Peng, L., and Qi, Y. (2010), “Smoothed Jackknife Empirical Likelihood Method for ROC Curve,” Journal of Multivariate Analysis, 101, 1520–1531. DOI: 10.1016/j.jmva.2010.01.012.
  • Graham, B. S. (2019), “Network Data,” Technical report, National Bureau of Economic Research.
  • Graham, B. S., Niu, F., and Powell, J. L. (2019), “Kernel Density Estimation for Undirected Dyadic Data,” arXiv preprint arXiv:1907.13630.
  • Graham, B. S., Niu, F., and Powell, J. L. (2021), “Minimax Risk and Uniform Convergence Rates for Nonparametric Dyadic Regression,” Technical report, National Bureau of Economic Research.
  • Hansen, B. E. (2008), “Uniform Convergence Rates for Kernel Estimation with Dependent Data,” Econometric Theory, 24, 726–748. DOI: 10.1017/S0266466608080304.
  • Hinkley, D. V. (1978), “Improving the Jackknife with Special Reference to Correlation Estimation,” Biometrika, 65, 13–21. DOI: 10.1093/biomet/65.1.13.
  • Hjort, N. L., McKeague, I. W., and Van Keilegom, I. (2009), “Extending the Scope of Empirical Likelihood,” Annals of Statistics, 37, 1079–1111.
  • Jing, B.-Y., Yuan, J., and Zhou, W. (2009), “Jackknife Empirical Likelihood,” Journal of the American Statistical Association, 104, 1224–1232. DOI: 10.1198/jasa.2009.tm08260.
  • Kallenberg, O. (2006), Probabilistic Symmetries and Invariance Principles, New York: Springer.
  • Kristensen, D. (2009), “Uniform Convergence Rates of Kernel Estimators with Hheterogeneous Dependent Data,” Econometric Theory, 24, 1433–1445. DOI: 10.1017/S0266466609090744.
  • Matsushita, Y., and Otsu, T. (2018), “Likelihood Inference on Semiparametric Models: Average Derivative and Treatment Effect,” Japanese Economic Review, 69, 133–155. DOI: 10.1111/jere.12167.
  • Matsushita, Y., and Otsu, T. (2021), “Jackknife Empirical Likelihood: Small Bandwidth, Sparse Network and High-Dimension Asymptotic,” Biometrika, forthcoming.
  • McCullagh, P. (2000), “Resampling and Exchangeable Arrays,” Bernoulli, 6, 285–301. DOI: 10.2307/3318577.
  • Menzel, K. (2021), “Bootstrap with Cluster-Dependence in Two or More Dimensions,” Econometrica, 89, 2143–2188. DOI: 10.3982/ECTA15383.
  • Owen, A. (1990), “Empirical Likelihood Ratio Confidence Regions,” Annals of Statistics, 18, 90–120.
  • Owen, A. B. (1988), “Empirical Likelihood Ratio Confidence Intervals for a Single Functional,” Biometrika, 75, 237–249. DOI: 10.1093/biomet/75.2.237.
  • Owen, A. B. (2001), Empirical Likelihood, Boca Raton, FL: CRC Press.
  • Owen, A. B. (2007), “The Pigeonhole Bootstrap,” Annals of Applied Statistics, 1, 386–411.
  • Peng, L. (2012), “Approximate Jackknife Empirical Likelihood Method for Estimating Equations,” Canadian Journal of Statistics, 40, 110–123. DOI: 10.1002/cjs.10138.
  • Peng, L., Qi, Y., and Van Keilegom, I. (2012), “Jackknife Empirical Likelihood Method for Copulas,” Test, 21, 74–92. DOI: 10.1007/s11749-011-0236-4.
  • Schlenker, W., and Walker, R. W. (2016), “Airports, Air Pollution, and Contemporaneous Health,” Review of Economic Studies, 83, 768–809. DOI: 10.1093/restud/rdv043.
  • Snijders, T. A., and Borgatti, S. P. (1999), “Non-Parametric Standard Errors and Tests for Network Statistics,” Connections, 22, 161–170.
  • Wang, R., Peng, L., and Qi, Y. (2013), “Jackknife Empirical Likelihood Test for Equality of Two High Dimensional Means,” Statistica Sinica, 23, 667–690.
  • Zhang, Z., and Zhao, Y. (2013), “Empirical Likelihood for Linear Transformation Models with Interval-Censored Failure Time Data,” Journal of Multivariate Analysis, 116, 398–409. DOI: 10.1016/j.jmva.2013.01.003.

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