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The American Statistician Volume 72, 2018 - Issue 3
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Statistical Practice

Predicting Home Run Production in Major League Baseball Using a Bayesian Semiparametric Model

Gilbert W. FellinghamDepartment of Statistics, Brigham Young University, Provo, UT
&
Jared D. FisherDepartment of Information, Risk, and Operations Management, University of Texas, TX
Pages 253-264 | Received 06 Apr 2015, Published online: 11 Jun 2018

References

  • Albright, S. (1993), “A Statistical Analysis of Hitting Streaks in Baseball,” Journal of the American Statistical Association, 88, 1175–1183.
  • Baseball-Reference.com (2017), “Baseball Encyclopedia of Players,” available at http://www.baseball-reference.com/players/.
  • Berry, S. M., Reese, C. S., and Larkey, P. D. (1999), “Bridging Different Eras in Sports,” Journal of American Statistical Association, 94, 661–684.
  • Blackwell, D., and MacQueen, J. B. (1973), “Ferguson Distributions Via Polya Urn Schemes,” The Annals of Statistics, 1, 353–355.
  • Carlin, B. P., and Louis, T. A. (2009), Bayesian Methods for Data Analysis (3rd ed.), London: Chapman & Hall.
  • Dahl, D. B., and Newton, M. A. (2007), “Multiple Hypothesis Testing by Clustering Treatment Effects,” Journal of the American Statistical Association 102, 517–526.
  • Escobar, M. D., and West, M. (1995), “Bayesian Density Estimation and Inference Using Mixtures,” Journal of the American Statistical Association, 90, 577–588.
  • Fellingham, G. W., Kottas, A., and Hartman, B. M. (2015), “Bayesian Nonparametric Predictive Modeling of Group Health Claims,” Insurance: Mathematics and Economics 60, 1–10.
  • Ferguson, T. (1973), “Bayesian Analysis of Some Nonparametric Problems,” Annals of Statistics, 1, 209–230.
  • Frigyik, B. A., Kapila, A., and Gupta, M. R. (2010), “Introduction to the Dirichlet Distribution and Related Processes,” Technical Report UWEETR-2010-0006, Department of Electrical Engineering, University of Washington.
  • Gelman, A., and Rubin, D. B. (1992), “Inference from Iterative Simulation Using Multiple Sequences,” Statistical Science, 7, 457–472.
  • Ghahramani, Z. (2013), “Bayesian Non-parametrics and the Probabilistic Approach to Modelling,” Philisophical Transactions of the Royal Society, 371, (UNSP 20110553).
  • Hastings, W. (1970), “Monte Carlo Sampling Methods Using Markov Chains and their Applications,” Biometrika 57, 97–109.
  • Jensen, S. T., McShane, B. B., and Wyner, A. J. (2009), “Hierarchical Bayesian Modeling of Hitting Performance in Baseball,” Bayesian Analysis 4, 631–652.
  • Lahman, S. (2016), “Lahman Baseball Database,” available at http://www.seanlahman.com/baseball-archive/statistics/.
  • MacEachern, S. N. (1998), “Computational Methods for Mixture of Dirichlet Process Models,” in Practical Nonparametric and Semiparametric Bayesian Statistics, Vol. 133 of Lecture Notes in Statistics, eds. D. Dey, P. Müller and D. Sinha, New York: Springer, pp. 23–43.
  • MacEachern, S. N., and Müller, P. (1998), “Estimating Mixture of Dirichlet Process Models,” Journal of Computational and Graphical Statistics 7, 223–238.
  • Metropolis, N., Rosenbluth, A. W., Rosenbluth, M. N., Teller, A. H. and Teller, E. (1953), “Equations of State Calculations by Fast Computing Machines,” Journal of Chemical Physics, 21, 1087–1092.
  • Müller, P., and Rosner, G. (1998), “Semiparametric PK/PD Models,” in Practical Nonparametric and Semiparametric Bayesian Statistics Vol. 133 of Lecture Notes in Statistics, eds. D. Dey, P. Müller, and D. Sinha, New York: Springer, pp. 323–337.
  • Neal, R. M. (2000), “Markov Chain Sampling Methods for Dirichlet Process Mixture Models,” Journal of Computational and Graphical Statistics, 9, 249–265.
  • NIMBLE Development Team (2017), “Nimble: An R Package for Programming with Bugs Models, Version 0.6-5,” available at http://r-nimble.org
  • Polson, N. G., Scott, J. G., and Windle, J. (2013), “Bayesian Inference for Logistic Models Using Polya-gamma Latent Variables,” Journal of the American Statistical Association, 108, 1339–1349.
  • Quintana, F. A., Müller, P., Rosner, G. L., and Munsell, M. (2008), “Semi-parametric Bayesian Inference for Multi-season Baseball Data,” Bayesian Analysis 3, 317–338.
  • Raftery, A. E., and Lewis, S. M. (1992), “One Long Run with Diagnostics: Implementation Strategies for Markov Chain Monte Carlo,” Statistical Science, 7, 493–497.
  • Schell, M. (1999), Baseball's All-Time Best Hitters, Princeton, NJ: Princeton University Press.
  • Sethuraman, J. (1994), “A Constructive Definition of Dirichlet Priors,” Statistica Sinica 4, 639–650.

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