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Journal of Business & Economic Statistics Volume 33, 2015 - Issue 4
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Original Articles

Simulation-Based Density Estimation for Time Series Using Covariate Data

Yin LiaoSchool of Economics and FinanceQueensland University of Technology, Brisbane, 4000, QLD, Australia([email protected])
&
John StachurskiResearch School of EconomicsAustralian National University, Canberra, 0200, ACT, Australia([email protected])
Pages 595-606 | Received 01 Jan 2014, Published online: 27 Oct 2015

REFERENCES

  • Aït-Sahalia, Y., Fan, J., and Peng, H. (2009), “Nonparametric Transition-Based Tests for Jump Diffusions,” Journal of the American Statistical Association, 104, 1102–1116.
  • Aït-Sahalia, Y., and Hansen, L.P. (2009), Handbook of Financial Econometrics (Vol. 1), North Holland.
  • Andel, J., Netuka, I., and Svara, K. (1984), “On Threshold Autoregressive Processes,” Kybernetika, 20, 89–106.
  • Bhattacharya, R.N., and Majumdar, M. (2007), Random Dynamical Systems: Theory and Applications, Cambridge: Cambridge University Press.
  • Bosq, D. (2000), Linear Processes in Function Space, New York: Springer-Verlag.
  • Braun, R.A., Li, H., and Stachurski, J. (2012), “Generalized Look-Ahead Methods for Computing Stationary Densities,” Mathematics of Operations Research, 37, 489–500.
  • Calabrese, R., and Zenga, M. (2010), “Bank Loan Recovery Rates: Measuring and Nonparametric Density Estimation,” Journal of Banking and Finance, 34, 903–911.
  • de Vincent-Humphreys, R., and Noss, J. (2012), “Estimating Probability Distributions of Future Asset Prices: Empirical Transformations From Option-Implied Risk-Neutral to Real-World Density Functions,” Bank of England Working Paper No. 455.
  • Dudley, Richard M. (2002), Real Analysis and Probability, (vol. 74), Cambridge University Press.
  • Escanciano, J.C., and Jacho-Chávez, D.T. (2012), “n-Uniformly Consistent Density Estimation in Nonparametric Regression Models,” Journal of Econometrics, 167, 305–316.
  • Frees, E.W. (1994), “Estimating Densities of Functions of Observations,” Journal of the American Statistical Association, 89, 517–525.
  • Gelfand, A.E., and Smith, A. F.M. (1990), “Sampling-Based Approaches to Calculating Marginal Densities,” Journal of the American Statistical Association, 85, 398–409.
  • Gine, E., and Mason, D.M. (2007), “On Local U-Statistic Processes and the Estimation of Densities of Functions of Several Sample Variables,” The Annals of Statistics, 35, 1105–1145.
  • He, L., Huh, S.W., and Lee, B.S. (2010), “Dynamic Factors and Asset Pricing,” Journal of the American Statistical Association, 45, 707–737.
  • Henderson, S.G., and Glynn, P.W. (2001), “Computing Densities for Markov Chains via Simulation,” Mathematics of Operations Research, 26, 375–400.
  • Kim, K., and Wu, W.B. (2007), “Density Estimation for Nonlinear Time Series,” Mimeo, Michigan State University.
  • Koopman, S.J., and Uspensky, E.H. (2002), “The Stochastic Volatility in Mean Model: Empirical Evidence From International Stock Markets,” Journal of Applied Econometrics, 17, 667–689.
  • Martin, V., Hurn, S., and Harris, D. (2012), Econometric Modelling with Time Series Specification, Estimation and Testing, Cambridge: Cambridge University Press.
  • Meyn, S., and Tweedie, R.W. (2009), Markov Chains and Stochastic Stability (2nd ed.), Cambridge: Cambridge University Press.
  • Polanski, A., and Stoja, E. (2011), “Dynamic Density Forecasts for Multivariate Asset Returns,” Journal of Forecasting, 30, 523–540.
  • Rosenblatt, M. (1956), “Remarks on Some Non-Parametric Estimates of a Density Function,” The Annals of Mathematical Statistics, 27, 832–837.
  • Saavedra, Angeles and Cao, Ricardo. (2000), “On the Estimation of the Marginal Density of a Moving Average Process,” Canadian Journal of Statistics, 28(4), 799–815.
  • Schick, A., and Wefelmeyer, W. (2004), “Functional Convergence and Optimality of Plug-in Estimators for Stationary Densities of Moving Average Processes,” Bernoulli, 10, 889–917.
  • ——— (2007), “Uniformly Root-n Consistent Density Estimators for Weakly Dependent Invertible Linear Processes,” The Annals of Statistics, 35, 815–843.
  • Smith, D.R., and Layton, A. (2007), “Comparing Probability Forecasts in Markov Regime Switching Business Cycle Models,” Journal of Business Cycle Measurement and Analysis, 479–498.
  • Støve, B., and Tjøstheim, D. (2012), “A Convolution Estimator for the Density of Nonlinear Regression Observations,” Scandinavian Journal of Statistics, 39, 282–304.
  • Van der Vaart, A. W. (1998), Asymptotic Statistics, Cambridge University Press.
  • Zhao, Z. (2010), “Density Estimation for Nonlinear Parametric Models With Conditional Heteroskedasticity,” Journal of Econometrics, 155, 71–82.
  • ——— (2011), “Nonparametric Model Validations for Hidden Markov Models With Applications in Financial Econometrics,” Journal of Econometrics, 162, 225–239.

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