| [1] |
Andrews, D. W. K. (1991), “Asymptotic Normality of Series Estimators for Nonparametric and Semiparametric Regression Models,” Econometrica, 59, 307-345. DOI: . · Zbl 0727.62047 |
| [2] |
Allers, M. A., and Elhorst, J. P. (2011), “A Simultaneous Equations Model of Fiscal Policy Interactions,” Journal of Regional Science, 51, 271-291. DOI: . |
| [3] |
Anselin, L. (2007), “Spatial Econometrics in RSUE: Retrospect and Prospect,” Regional Science and Urban Economics, 37, 450-456. DOI: . |
| [4] |
Baltagi, B. H., and Bresson, G. (2011), “Maximum Likelihood Estimation and Lagrange Multiplier Tests for Panel Seemingly Unrelated Regressions With Spatial Lag and spatial Errors: An Application to Hedonic Housing Prices in Paris,” Journal of Urban Economics, 69, 24-42. DOI: . |
| [5] |
Baltagi, B. H., and Deng, Y. (2015), “EC3SLS Estimator for a Simultaneous System of Spatial Autoregressive Equations With Random Effects,” Econometric Reviews, 34, 659-694. DOI: . · Zbl 1491.62177 |
| [6] |
Bajari, P., Hong, H., Krainer, J., and Nekipelov, D. (2010), “Estimating Static Models of Strategic Interactions,” Journal of Business & Economic Statistics, 28, 469-482. DOI: . · Zbl 1202.62174 |
| [7] |
Berri, D. J. (1999), “Who Is Most Valuable? Measuring the Player’s Production of Wins in the NBA,” Managerial & Decision Economics, 20, 411-427. |
| [8] |
Berri, D., Schmidt, M., and Brook, S. (2006), The Wages of Wins: Taking Measure of the Many Myths in Modern Sport, Stanford, CA: Stanford University Press. |
| [9] |
Bourguignon, F., Fournier, M., and Gurgand, M. (2007), “Selection Bias Corrections Based on the Multinomial Logit Model: Monte Carlo Comparisons,” Journal of Economic Surveys, 21, 174-205. DOI: . |
| [10] |
Bramoullé, Y., Djebbari, H., and Fortin, B. (2009), “Identification of Peer-Effects Through Social Networks,” Journal of Econometrics, 150, 41-55. DOI: . · Zbl 1429.91254 |
| [11] |
Brock, W. A., and Durlauf, S. N. (2002), “A Multinomial Choice Model With Neighborhood Effects,” American Economic Review, 92, 298-303. DOI: . |
| [12] |
Brock, W. A., and Durlauf, S. N. (2006), “Multinomial Choice With Social Interactions,” in The Economy as an Evolving Complex System (Vol. III), eds. Blume, L. E. and Durlauf, S. N., Oxford: Oxford University Press, pp. 175-206. |
| [13] |
Calvo, J. L., Garcia, M. A., and Navandar, A. (2017), “Analysis of Mismatch After Ball Screens in Spanish Professional Basketball,” International Journal of Performance Analysis in Sport, 17, 555-562. DOI: . |
| [14] |
Chernozhukov, V., Chetverikov, D., Demirer, M., Duflo, E., Hansen, C., Newey, W., and Robins, J. (2018), “Double/Debiased Machine Learning for Treatment and Structural Parameters,” The Econometrics Journal, 21, C1-C68. DOI: . · Zbl 07565928 |
| [15] |
Cliff, A., and Ord, J. (1973), Spatial Autocorrelation, London: Pion. |
| [16] |
Cliff, A., and Ord, J. (1981), Spatial Processes, Models and Applications, London: Pion. · Zbl 0598.62120 |
| [17] |
Cohen-Cole, E., Liu, X., and Zenou, Y. (2017), “Multivariate Choices and Identification of Social Interactions,” Journal of Applied Econometrics, 33, 165-178. DOI: . |
| [18] |
Craven, P., and Wahba, G. (1979), “Smoothing Noisy Data With Spline Functions: Estimating the Correct Degree of Smoothing by the Method of Generalized Cross-Validation,” Numerische Mathematik, 31, 377-403. DOI: . · Zbl 0377.65007 |
| [19] |
Dahl, G. B. (2002), “Mobility and the Return to Education: Testing a Roy Model With Multiple Markets,” Econometrica, 70, 2367-2420. DOI: . · Zbl 1137.91560 |
| [20] |
Elhorst, J. P., Lacombe, D. J., and Piras, G. (2012), “On Model Specification and Parameter Space Definitions in Higher Order Spatial Econometrics Models,” Regional Science and Urban Economics, 42, 211-220. DOI: . |
| [21] |
Gebremariam, G. H., Gebremedhin, T. G., and Schaeffer, P. V. (2011), “Employment, Income, and Migration in Appalachia: A Spatial Simultaneous Equations Approach,” Journal of Regional Science, 51, 102-120. DOI: . |
| [22] |
Goldsmith-Pinkham, P., and Imbens, G. W. (2013), “Social Networks and the Identification of Peer Effects,” Journal of Business & Economic Statistics, 31, 253-264. DOI: . |
| [23] |
Heckman, J. J. (1979), “Sample Selection Bias as a Specification Error,” Econometrica, 47, 153-161. DOI: . · Zbl 0392.62093 |
| [24] |
Horrace, W. C., and Jung, H. (2018), “Stochastic Frontier Models With Network Selectivity,” Journal of Productivity Analysis, 50, 101-116. DOI: . |
| [25] |
Horrace, W. C., Liu, X., and Patacchini, E. (2016), “Endogenous Network Production Functions With Selectivity,” Journal of Econometrics, 190, 222-232. DOI: . · Zbl 1422.91402 |
| [26] |
Hoshino, T. (2019), “Two-Step Estimation of Incomplete Information Social Interaction Models With Sample Selection,” Journal of Business and Economic Statistics, 37, 598-612. DOI: . |
| [27] |
Hsieh, C. S., and Lee, L. F. (2016), “A Social Interactions Model With Endogenous Friendship Formation and Selectivity,” Journal of Applied Econometrics, 31, 301-319. DOI: . |
| [28] |
Jeanty, P. W., Partridge, M., and Irwin, W. (2010), “Estimation of a Spatial Simultaneous Equation Model of Population Migration and Housing Price Dynamics,” Regional Science and Urban Economics, 40, 343-352. DOI: . |
| [29] |
Kelejian, H. H., and Prucha, I. R. (1999), “Generalized Moments Estimator for the Autoregressive Parameter in a Spatial Model,” International Economic Review, 40, 509-533. DOI: . |
| [30] |
Kelejian, H. H., and Prucha, I. R. (2001), “On the Asymptotic Distribution of the Moran I Test Statistic With Applications,” Journal of Econometrics, 104, 219-257. · Zbl 1002.62019 |
| [31] |
Kelejian, H. H., and Prucha, I. R. (2004), “Estimation of Simultaneous Systems of Spatially Interrelated Cross Sectional Equations,” Journal of Econometrics, 118, 27-50. · Zbl 1033.62050 |
| [32] |
Kim, M., and Sun, Y. (2016), “Bootstrap and k-Step Bootstrap Bias Corrections for the Fixed Effects Estimator in Nonlinear Panel Data Models,” Econometric Theory, 32, 1523-1568. DOI: . · Zbl 1385.62024 |
| [33] |
Kraus, M. W., Huang, C., and Keltner, D. (2010), “Tactile Communication, Cooperation, and Performance: An Ethological Study of the NBA,” Emotion, 10, 745. DOI: . |
| [34] |
Lee, L. F. (1983), “Generalized Econometric Models With Selectivity,” Econometrica, 51, 507-512. DOI: . · Zbl 0516.62094 |
| [35] |
Lee, L. F. (2001), “Generalized Method of Moments Estimation of Spatial Autoregressive Processes,” Manuscript, Department of Economics, Ohio State University. |
| [36] |
Lee, L. F. (2003), “Best Spatial Two-Stage Least Squares Estimators for a Spatial Autoregressive Model With Autoregressive Disturbances,” Econometric Reviews, 22, 307-335. · Zbl 1030.62069 |
| [37] |
Lee, L. F. (2004), “Asymptotic Distributions of Quasi-Maximum Likelihood Estimators for Spatial Econometric Models,” Econometrica, 72, 1899-926. · Zbl 1142.62312 |
| [38] |
Lee, L. F. (2007a), “Identification and Estimation of Econometric Models With Group Interactions, Contextual Factors and Fixed Effects,” Journal of Econometrics, 140, 333-374. · Zbl 1247.91140 |
| [39] |
Lee, L. F. (2007b), “GMM and 2SLS Estimation of Mixed Regressive, Spatial Autoregressive Models,” Journal of Econometrics, 137, 489-514. · Zbl 1360.62476 |
| [40] |
Lee, L. F., and Liu, X. (2010), “Efficient GMM Estimation of High Order Spatial Autoregressive Models With Autoregressive Disturbances,” Econometric Theory, 26, 187-230. DOI: . · Zbl 1181.62137 |
| [41] |
Lee, L. F., Liu, X., and Lin, X. (2010), “Specification and Estimation of Social Interaction Models With Network Structures,” The Econometrics Journal, 13, 145-176. DOI: . · Zbl 1217.91162 |
| [42] |
Lee, L. F., and Yu, J. (2010), “Estimation of Spatial Autoregressive Panel Data Models With Fixed Effects,” Journal of Econometrics, 154, 165-185. DOI: . · Zbl 1431.62643 |
| [43] |
Lee, L. F., and Yu, J. (2014), “Efficient GMM Estimation of Spatial Dynamic Panel Data Models With Fixed Effects,” Journal of Econometrics, 180, 174-197. · Zbl 1293.62193 |
| [44] |
Lin, X., and Lee, L. F. (2010), “GMM Estimation of Spatial Autoregressive Models With Unknown Heteroskedasticity,” Journal of Econometrics, 157, 34-52. DOI: . · Zbl 1431.62399 |
| [45] |
Liu, X. (2014), “Identification and Efficient Estimation of Simultaneous Equations Network Models,” Journal of Business & Economic Statistics, 32, 516-536. DOI: . |
| [46] |
Manski, C. F. (1993), “Identification of Endogenous Social Effects: The Reflection Problem,” Review of Economic Studies, 60, 531-542. DOI: . · Zbl 0800.90377 |
| [47] |
Marcoux, M. (2020), “Unobservable Heterogeneity and Identification in Games: An Application to Mobile Telecommunications,”Unpublished Manuscript, Université de Montréal. |
| [48] |
Marmarinos, C., Apostolidis, N., Kostopoulos, N., and Apostolidis, A. (2016), “Efficacy of the ‘Pick and Roll’ Offense in Top Level European Basketball Teams,” Journal of Human Kinetics, 50, 121-129. DOI: . |
| [49] |
McCaffery and Bickart (2013), “The Science of Team Chemistry: Measuring Team Chemistry from Human Biology in Basketball and Soccer,” Presentation to the MIT Sloan Sports Analytics Conference, Boston, MA. |
| [50] |
Moffitt, R. A. (2001), “Policy Interventions, Low-Level Equilibria, and Social Interactions,” in Social Dynamics, eds. Durlauf, S. N. and Young, H. P., Cambridge, MA: MIT Press, pp. 45-82. |
| [51] |
Murphy, K. M., and Topel, R. H. (1985), “Estimation and Inference in Two-Step Econometric Models,” Journal & Business and Economic Statistics, 3, 370-379. DOI: . |
| [52] |
Newey, W. K. (1994), “The Asymptotic Variance of Semiparametric Estimators,” Econometrica, 62, 1349-1382. DOI: . · Zbl 0816.62034 |
| [53] |
Newey, W. K. (1997), “Convergence Rates and Asymptotic Normality for Series Estimators,” Journal of Econometrics, 79, 147-168. · Zbl 0873.62049 |
| [54] |
Newey, W. K. (2009), “Two Step Series Estimation of Sample Selection Models,” Econometrics Journal, 12, 217-229. · Zbl 1181.62036 |
| [55] |
Newey, W. K., Powell, J. L., and Walker, J. R. (1990), “Semiparametric Estimation of Selection Models: Some Empirical Results,” The American Economic Review, 80, 324-328. |
| [56] |
Neyman, J. and Scott, E. L. (1948), “Consistent Estimates Based on Partially Consistent Observations,” Econometrica, 16, 1-32. DOI: . · Zbl 0034.07602 |
| [57] |
Olley, G. S., and Pakes, A. (1996), “The Dynamics of Productivity in the Telecommunications Equipment Industry,” Econometrica, 64, 1263-1297. DOI: . · Zbl 0862.90024 |
| [58] |
Qu, X., and Lee, L. F. (2015), “Estimating a Spatial Autoregressive Model With an Endogenous Spatial Weight Matrix,” Journal of Econometrics, 184, 209-232. DOI: . · Zbl 1332.62342 |
| [59] |
Schmertmann, C. P. (1994), “Selectivity Bias Correction Methods in Polychotomous Sample Selection Models,” Journal of Econometrics, 60, 101-132. DOI: . · Zbl 0795.62105 |
| [60] |
Schrage, M. (2014), Team Chemistry Is the New Holy Grail of Performance Analytics, Boston, MA: Harvard Business School Publishing. |
| [61] |
Scornet, E., Biau, G., and Vert, J. P. (2015), “Consistency of Random Forests,” The Annals of Statistics, 43, 1716-1741. DOI: . · Zbl 1317.62028 |
| [62] |
Yang, K., and Lee, L. F. (2017), “Identification and QML Estimation of Multivariate and Simultaneous Equations Spatial Autoregressive Models,” Journal of Econometrics, 196, 196-214. DOI: . · Zbl 1443.62310 |
| [63] |
Wager, S., and Walther, G. (2015), “Adaptive Concentration of Regression Trees With Application to Random Forests,” arXiv no. 1503.06388. |
| [64] |
Wang, H., and Li, R. (2007), “Tuning Parameter Selectors for the Smoothly Clipped Absolute Deviation Method,” Biometrika, 94, 553-568. DOI: . · Zbl 1135.62058 |
