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Journal of the American Statistical Association Volume 117, 2022 - Issue 538
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Theory and Methods

Center-Outward R-Estimation for Semiparametric VARMA Models

M. Hallina ECARES, Université libre de Bruxelles, Bruxelles, BelgiumCorrespondence[email protected]
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,
D. La Vecchiab GSEM, Research Center for Statistics, University of Geneva, Geneva, SwitzerlandView further author information
&
H. Liuc International Institute of Finance, School of Management, University of Science and Technology of China, Hefei, ChinaView further author information
Pages 925-938 | Received 18 Oct 2019, Accepted 26 Sep 2020, Published online: 07 Dec 2020

References

  • Allal, J. , Kaaouachi, A. , and Paindaveine, D. (2001), “R-Estimation for ARMA Models,” Journal of Nonparametric Statistics , 13, 815–831. DOI: https://doi.org/10.1080/10485250108832879.
  • Andreou, E. , and Werker, B. (2015), “Residual-Based Rank Specification Tests for AR-GARCH Type Models,” Journal of Econometrics , 185, 305–331. DOI: https://doi.org/10.1016/j.jeconom.2014.11.001.
  • Andrews, B. (2008), “Rank-Based Estimation for Autoregressive Moving Average Time Series Models,” Journal of Time Series Analysis , 29, 51–73.
  • Andrews, B. (2012), “Rank-Based Estimation for GARCH Processes,” Econometric Theory , 28, 1037–1064.
  • Bickel, P. J. , Klaassen, C. A. J. , Ritov, Y. , and Wellner, J. A. (1993), Efficient and Adaptive Estimation for Semiparametric Models , Baltimore, MD: Johns Hopkins University Press.
  • Boeckel, M. , Spokoiny, V. , and Suvorikova, A. (2018), “Multivariate Brenier Cumulative Distribution Functions and Their Application to Nonparametric Testing,” arXiv no. 1809.04090.
  • Carlier, G. , Chernozhukov, V. , and Galichon, A. (2016), “Vector Quantile Regression,” The Annals of Statistics , 44, 1165–1192. DOI: https://doi.org/10.1214/15-AOS1401.
  • Chernozhukov, V. , Galichon, A. , Hallin, M. , and Henry, M. (2017), “Monge- Kantorovich Depth, Quantiles, Ranks, and Signs,” The Annals of Statistics , 45, 223–256. DOI: https://doi.org/10.1214/16-AOS1450.
  • Croux, C. , and Joossens, K. (2008), “Robust Estimation of the Vector Autoregressive Model by a Least Trimmed Squares Procedure,” in COMPSTAT 2008 , pp. 489–501.
  • Cuesta-Albertos, J. A. , and Matrán, C. (1989), “Notes on the Wasserstein Metric in Hilbert Spaces,” The Annals of Probability , 17, 1264–1276. DOI: https://doi.org/10.1214/aop/1176991269.
  • Deb, N. and Sen, B. (2019), “Multivariate Rank-based Distribution-free Nonparametric Testing Using Measure Transportation,” arXiv no. 1909.08733.
  • Deb, L. , Ghosal, P. , and Sen, B. (2020), “Measuring Association on Topological Spaces Using Kernels and Geometric Graphs,” arXiv no. 200.01768.
  • del Barrio, E. , Gonzáles Sanz, A. , and Hallin, M. (2020), “A Note on the Regularity of Center-Outward Distribution and Quantile Functions,” Journal of Multivariate Analysis (in press). DOI: https://doi.org/10.1016/j.jmva.2020.104671.
  • Engle, R. W. (2002), “Dynamic Conditional Correlation,” Journal of Business & Economic Statistics , 20, 339–350.
  • Figalli, A. (2018), “On the Continuity of Center-Outward Distribution and Quantile Functions,” Nonlinear Analysis , 177, 413–421. DOI: https://doi.org/10.1016/j.na.2018.05.008.
  • Galichon, A. (2017), “A Survey of Some Recent Applications of Optimal Transport Methods to Econometrics,” Econometrics Journal , 20, C1–C11. DOI: https://doi.org/10.1111/ectj.12083.
  • Garel, B. , and Hallin, M. (1995), “Local Asymptotic Normality of Multivariate ARMA Processes With a Linear Trend,” Annals of the Institute of Statistical Mathematics , 47, 551–579.
  • Ghosal, P. and Sen, B. (2019), “Multivariate Ranks and Quantiles Using Optimal Transportation and Applications to Goodness-of-Fit Testing,” arXiv no. 1905.05340.
  • Hallin, M. (2017), “On Distribution and Quantile Functions, Ranks and Signs in Rd ,” ECARES WP, available at https://ideas.repec.org/p/eca/wpaper/2013-258262.html.
  • Hallin, M. , del Barrio, E. , Cuesta-Albertos, J. , and Matrán, C. (2020), “Center-Outward Distribution and Quantile Functions, Ranks, and Signs in Dimension d: A Measure Transportation Approach,” The Annals of Statistics (in press).
  • Hallin, M. , Hlubinka, D. , and Hudecová, Š. (2020), “Efficient Center-Outward Rank Tests for Multiple-Output Regression and MANOVA,” arXiv no. 2007.15496.
  • Hallin, M. , and La Vecchia, D. (2017), “R-Estimation in Semiparametric Dynamic Location-Scale Models,” Journal of Econometrics , 2, 233–247. DOI: https://doi.org/10.1016/j.jeconom.2016.08.002.
  • Hallin, M. , and La Vecchia, D. (2019), “A Simple R-Estimation Method for Semiparametric Duration Models,” Journal of Econometrics , 218, 736–749.
  • Hallin, M. , Oja, H. , and Paindaveine, D. (2006), “Semiparametrically Efficient Rank-Based Inference for Shape: II Optimal R-Estimation of Shape,” The Annals of Statistics , 34, 2757–2789. DOI: https://doi.org/10.1214/009053606000000948.
  • Hallin, M. , and Paindaveine, D. (2002a), “Optimal Tests for Multivariate Location Based on Interdirections and Pseudo-Mahalanobis Ranks,” The Annals of Statistics , 30, 1103–1133. DOI: https://doi.org/10.1214/aos/1031689019.
  • Hallin, M. , and Paindaveine, D. (2002b), “Optimal Procedures Based on Interdirections and Pseudo-Mahalanobis Ranks for Testing Multivariate Elliptic White Noise Against ARMA Dependence,” Bernoulli , 8, 787–815.
  • Hallin, M. , and Paindaveine, D. (2004), “Rank-Based Optimal Tests of the Adequacy of an Elliptic VARMA Model,” The Annals of Statistics , 32, 2642–2678.
  • Hallin, M. , and Paindaveine, D. (2005), “Asymptotic Linearity of Serial and Nonserial Multivariate Signed Rank Statistics,” Journal of Statistical Planning and Inference , 136, 1–32.
  • Hallin, M. , and Puri, M. L. (1994), “Aligned Rank Tests for Linear Models With Autocorrelated Errors,” Journal of Multivariate Analysis , 50, 175–237. DOI: https://doi.org/10.1006/jmva.1994.1040.
  • Hallin, M. , van den Akker, R. , and Werker, B. (2015), “On Quadratic Expansions of Log-Likelihoods and a General Asymptotic Linearity Result,” in Mathematical Statistics and Limit Theorems, Festschrift in Honor of Paul Deheuvels , eds. M. Hallin , D. Mason , D. Pfeifer , and J. Steinebach , Cham, Switzerland: Springer, pp. 147–166.
  • Hallin, M. , and Werker, B. (2003), “Semiparametric Efficiency, Distribution-Freeness, and Invariance,” Bernoulli , 9, 137–165. DOI: https://doi.org/10.3150/bj/1068129013.
  • Hettmansperger, T. P. and McKean, J. W. (2011), Robust Nonparametric Statistical Methods, 2nd Edition, Boca Raton: CRC Press.
  • Hodges, J. , and Lehmann, E. L. (1956), “The Efficiency of Some Nonparametric Competitors of the t-Test,” The Annals of Mathematical Statistics , 34, 324–335. DOI: https://doi.org/10.1214/aoms/1177728261.
  • Jaeckel, L. A. (1972), “Estimating Regression Coefficients by Minimizing the Dispersion of the Residuals,” The Annals of Mathematical Statistics , 43, 1449–1458. DOI: https://doi.org/10.1214/aoms/1177692377.
  • Jurečková, J. (1969), “Asymptotic Linearity of a Rank Statistic in Regression Parameter,” The Annals of Mathematical Statistics , 40, 1889–1900.
  • Jurečková, J. (1971), “Nonparametric Estimate of Regression Coefficients,” The Annals of Mathematical Statistics , 42, 1328–1338.
  • Kilian, L. (1998), “Small-Sample Confidence Intervals for Impulse Response Functions,” The Review of Economics and Statistics , 80, 218–230. DOI: https://doi.org/10.1162/003465398557465.
  • Koul, H. (1971), “Asymptotic Behavior of a Class of Confidence Regions Based on Ranks in Regression,” The Annals of Mathematical Statistics , 42, 466–476. DOI: https://doi.org/10.1214/aoms/1177693398.
  • Koul, H. , and Ossiander, M. (1994), “Weak Convergence of Randomly Weighted Dependent Residual Empiricals With Applications to Autoregression,” The Annals of Statistics , 22, 540–562. DOI: https://doi.org/10.1214/aos/1176325383.
  • Koul, H. L. , and Saleh, A. M. E. (1993), “R-Estimation of the Parameters of Autoregressive AR(p) Models,” The Annals of Statistics , 21, 534–551. DOI: https://doi.org/10.1214/aos/1176349041.
  • Liu, R. Y. (1992), “Data Depth and Multivariate Rank Tests,” in L1 Statistics and Related Methods , ed. Y. Dodge , Amsterdam: North-Holland, pp. 279–294.
  • Le Cam, L. , and Yang, G. L. (2000), Asymptotics in Statistics: Some Basic Concepts (2nd ed.), New York: Springer.
  • Liu, R. Y. , and Singh, K. (1993), “A Quality Index Based on Data Depth and Multivariate Rank Tests,” Journal of the American Statistical Association , 88, 257–260.
  • Lütkepohl, H. (1990), “Asymptotic Distributions of Impulse Response Functions and Forecast Error Variance Decompositions of Vector Autoregressive Models,” The Review of Economics and Statistics , 72, 116–125.
  • Maronna, R. , Martin, D. , Yohai, V. , and Salibian-Barrera, M. (2019), Robust Statistics: Theory and Methods (With R ), Chichester: Wiley.
  • Mukherjee, K. (2007), “Generalized R-Estimators Under Conditional Heteroscedasticity,” Journal of Econometrics , 141, 383–415. DOI: https://doi.org/10.1016/j.jeconom.2006.10.002.
  • Mukherjee, K. , and Bai, Z. (2002), “R-Estimation in Autoregression With Square-Integrable Score Function,” Journal of Multivariate Analysis , 81, 167–186. DOI: https://doi.org/10.1006/jmva.2001.1998.
  • Oja, H. (2010), Multivariate Nonparametric Methods With R: An Approach Based on Spatial Signs and Ranks , New York: Springer.
  • Panaretos, V. M. , and Zemel, Y. (2019), “Statistical Aspects of Wasserstein Distances,” Annual Review of Statistics and Its Application , 6, 405–431. DOI: https://doi.org/10.1146/annurev-statistics-030718-104938.
  • Puri, M. L. , and Sen, P. K. (1971), Nonparametric Methods in Multivariate Analysis , New York: Wiley.
  • Rachev, S. T. , and Rüschendorf, L. (1998), Mass Transportation Problems I and II , New York: Springer.
  • Shi, H. , Drton, M. , and Han, F. (2020), “Distribution-free Consistent Independence Tests via Center-Outward Tanks and Signs,” Journal of the American Statistical Association (in press).
  • Shi, H. , Hallin, M. , Drton, M. , and Han, F. (2020), “Rate Optimality of Consistent Distribution-free Tests of Independence Based on Center-Outward Ranks and Signs,” arXiv no. 2007.02186.
  • Santner, T. J. , Williams, B. J. , and Notz, W. I. (2003), The Design and Analysis of Computer Experiments , New York: Springer-Verlag.
  • Terpstra, J. T. , McKean, J. W. , and Naranjo, J. D. (2001), “GR-Estimates for an Autoregressive Time Series,” Statistics & Probability Letters , 51, 165–172.
  • Tsay, R. S. (2014), Multivariate Time Series Analysis With R and Financial Applications , Hoboken, NJ: Wiley.
  • van der Vaart, A. (1998), Asymptotic Statistics , Cambridge: Cambridge University Press.
  • van Eeden, C. (1972), “An Analogue, for Signed Rank Statistics, of Jurečková’s Asymptotic Linearity Theorem for Rank Statistics,” The Annals of Mathematical Statistics , 43, 791–802. DOI: https://doi.org/10.1214/aoms/1177692545.

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