References
- Andrieu, C., Doucet, A., and Holenstein, R. (2010), “Particle Markov Chain Monte Carlo Methods,” Journal of the Royal Statistical Society, Series B, 72, 269–342. DOI: 10.1111/j.1467-9868.2009.00736.x.
- Andrieu, C., and Roberts, G. (2009), “The Pseudo-Marginal Approach for Efficient Monte Carlo Computations,” The Annals of Statistics, 37, 697–725. DOI: 10.1214/07-AOS574.
- Choppala, P., Gunawan, D., Chen, J., Tran, M. N., and Kohn, R. (2016), “Bayesian Inference for State-Space Models Using Block and Correlated Pseudo Marginal Methods,” arXiv:1612.07072v1.
- Christen, J. A., and Fox, C. (2005), “Markov Chain Monte Carlo Using an Approximation,” Journal of Computational and Graphical Statistics, 14, 795–810. DOI: 10.1198/106186005X76983.
- Christiano, L. J., Eichenbaum, M., and Evans, C. L. (2005), “Nominal Rigidities and the Dynamic Effects of a Shock to Monetary Policy,” Journal of Political Economy, 113, 1–45. DOI: 10.1086/426038.
- Cross, J. L., Hou, C., Koop, G., and Poon, A. (2021), “Macroeconomic Forecasting with Large Stochastic Volatility in Mean VARs,” BI Norwegian Business School. https://www.oru.se/contentassets/b70754c1297e4b65993aa6115c0f5d0c/cross-macroeconomic-forecasting-with-large-stochastic-volatility-in-mean-vars.pdf.
- Deligiannidis, G., Doucet, A., and Pitt, M. (2018), “The Correlated Pseudo-Marginal Method,” Journal of Royal Statistical Society, Series B, 80, 839–870. DOI: 10.1111/rssb.12280.
- Fernández-Villaverde, J., and Levintal, O. (2018), “Solution Methods for Models with Rare Disasters,” Quantitative Economics, 9, 903–944. DOI: 10.3982/QE744.
- Fernández-Villaverde, J., and Rubio-Ramírez, J. F. (2007), “Estimating Macroeconomic Models: A Likelihood Approach,” Review of Economic Studies, 74, 1059–1087. DOI: 10.1111/j.1467-937X.2007.00437.x.
- Garthwaite, P. H., Fan, Y., and Sisson, S. A. (2015), “Adaptive Optimal Scaling of Metropolis-Hastings Algorithms Using the Robbins-Monro Process,” Communications in Statistics - Theory and Methods, 45, 5098–5111. DOI: 10.1080/03610926.2014.936562.
- Gordon, N., Salmond, D., and Smith, A. (1993), “A Novel Approach to Nonlinear and non-Gaussian Bayesian State Estimation,” IEE-Proceedings F, 140, 107–113.
- Guarniero, P., Johansen, A. M., and Lee, A. (2017), “The Iterated Auxiliary Particle Filter,” Journal of American Statistical Association, 112, 1636–1647. DOI: 10.1080/01621459.2016.1222291.
- Gust, C., Herbst, E., López-Salido, D., and Smith, M. E. (2017), “The Empirical Implications of the Interest-Rate Lower Bound,” American Economic Review, 107, 1971–2006. DOI: 10.1257/aer.20121437.
- Hall, J., Pitt, M. K., and Kohn, R. (2014), “Bayesian Inference for Nonlinear Structural Time Series Models,” Journal of Econometrics, 179, 99–111. DOI: 10.1016/j.jeconom.2013.10.016.
- Herbst, E., and Schorfheide, F. (2019), “Tempered Particle Filtering,” Journal of Econometrics, 210, 26–44. DOI: 10.1016/j.jeconom.2018.11.003.
- Hesterberg, T. (1995), “Weighted Average Importance Sampling and Defensive Mixture Distributions,” Technometrics, 37, 185–194. DOI: 10.1080/00401706.1995.10484303.
- Johnson, A. A., Jones, G. L., and Neath, R. C. (2013), “Component-Wise Markov Chain Monte Carlo: Uniform and Geometric Ergodicity under Mixing and Composition,” Statistical Science, 28, 360–375. DOI: 10.1214/13-STS423.
- Kitagawa, G. (1996), “Monte Carlo Filter and Smoother for Non-Gaussian Nonlinear State Space Models,” Journal of Computational and Graphical Statistics, 5, 1–25. DOI: 10.2307/1390750.
- Murray, L. M., Jones, E. M., and Parslow, J. (2013), “On Disturbance State-Space Models and the Particle Marginal Metropolis-Hastings Sampler,” SIAM/ASA Journal on Uncertainty Quantification, 1, 494–521. DOI: 10.1137/130915376.
- Norgaard, M., Poulsen, N. K., and Ravn, O. (2000), “New Developments in State Estimation for Nonlinear Systems,” Automatica, 36, 1627–1638. DOI: 10.1016/S0005-1098(00)00089-3.
- Pitt, M. K., Silva, R. S., Giordani, P., and Kohn, R. (2012), “On Some Properties of Markov Chain Monte Carlo Simulation Methods based on the Particle Filter,” Journal of Econometrics, 171, 134–151. DOI: 10.1016/j.jeconom.2012.06.004.
- Plummer, M., Best, N., Cowles, K., and Vines, K. (2006), “CODA: Convergence Diagnosis and Output Analysis of MCMC,” R News, 6, 7–11.
- Roberts, G. O., and Rosenthal, J. S. (2009), “Examples of Adaptive MCMC,” Journal of Computational and Graphical Statistics, 18, 349–367. DOI: 10.1198/jcgs.2009.06134.
- Rotemberg, J. J. (1982), “Sticky Prices in the United States,” Journal of Political Economy, 90, 1187–1211. DOI: 10.1086/261117.
- Shephard, N., Chib, S., and Pitt, M. K. (2004), “Likelihood-based Inference for Diffusion-Driven Models,” Technical Report. https://www.nuff.ox.ac.uk/economics/papers/2004/w20/chibpittshephard.pdf.
- Sherlock, C., Thiery, A. H., and Lee, A. (2017), “Pseudo-Marginal Metropolis-Hastings Sampling Using Averages of Unbiased Estimators,” Biometrika, 104, 727–734. DOI: 10.1093/biomet/asx031.
- Skilling, J. (2004), “Programming the Hilbert Curve,” AIP Conference Proceedings, 707, 381–387.
- Smets, F., and Wouters, R. (2007), “Shocks and Frictions in US Business Cycles: A Bayesian DSGE Approach,” The American Economic Review, 97, 586–606. DOI: 10.1257/aer.97.3.586.
- Stramer, O., and Bognar, M. (2011), “Bayesian Inference for Irreducible Diffusion Processes Using the Pseudo-Marginal Approach,” Bayesian Analysis, 6, 231–258. DOI: 10.1214/11-BA608.
- Tran, M. N., Kohn, R., Quiroz, M., and Villani, M. (2016), “Block-Wise Pseudo-Marginal Metropolis-Hastings,” arXiv:1603.02485v2.