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Unbiased Markov chain quasi-Monte Carlo for Gibbs samplers (2403.04407v3)

Published 7 Mar 2024 in math.NA and cs.NA

Abstract: In statistical analysis, Monte Carlo (MC) stands as a classical numerical integration method. When encountering challenging sample problem, Markov chain Monte Carlo (MCMC) is a commonly employed method. However, the MCMC estimator is biased after a fixed number of iterations. Unbiased MCMC, an advancement achieved through coupling techniques, addresses this bias issue in MCMC. It allows us to run many short chains in parallel. Quasi-Monte Carlo (QMC), known for its high order of convergence, is an alternative of MC. By incorporating the idea of QMC into MCMC, Markov chain quasi-Monte Carlo (MCQMC) effectively reduces the variance of MCMC, especially in Gibbs samplers. This work presents a novel approach that integrates unbiased MCMC with MCQMC, called as an unbiased MCQMC method. This method renders unbiased estimators while improving the rate of convergence significantly. Numerical experiments demonstrate that for Gibbs sampling, unbiased MCQMC with a sample size of $N$ yields a faster root mean square error (RMSE) rate than the (O(N{-1/2})) rate of unbiased MCMC, toward an RMSE rate of (O(N{-1})) for low-dimensional problems. Surprisingly, in a challenging problem of 1049-dimensional P\'olya Gamma Gibbs sampler, the RMSE can still be reduced by several times for moderate sample sizes. In the setting of parallelization, unbiased MCQMC also performs better than unbiased MCMC, even running with short chains.

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References (43)
  1. A comparison of some Monte Carlo and quasi-Monte Carlo techniques for option pricing. In Monte Carlo and Quasi-Monte Carlo Methods 1996, pages 1–18. Springer, 1998.
  2. Su Chen. Consistency and convergence rate of Markov chain quasi Monte Carlo with examples. PhD thesis, Stanford University, 2011.
  3. Consistency of Markov chain quasi-Monte Carlo on continuous state spaces. The Annals of Statistics, 39(2):673–701, 2011.
  4. New inputs and Methods for Markov chain quasi-Monte Carlo. In Monte Carlo and Quasi-Monte Carlo Methods 2010, volume 23, pages 313–327. Springer Berlin Heidelberg, 2012.
  5. Randomization of number theoretic methods for multiple integration. SIAM Journal on Numerical Analysis, 13(6):904–914, 1976.
  6. Luc Devroye. Non-uniform Random Variate Generation. Springer, 1986.
  7. Digital Nets and Sequences: Discrepancy Theory and Quasi-Monte Carlo Integration. Cambridge University Press, 2010.
  8. Discrepancy estimates for variance bounding Markov chain quasi-Monte Carlo. Electronic Journal of Probability, 19:1–24, 2014.
  9. Discrepancy bounds for uniformly ergodic Markov chain quasi-Monte Carlo. The Annals of Applied Probability, 26(5):3178–3205, 2016.
  10. D. J. Finney. The estimation from individual records of the relationship between dose and quantal response. Biometrika, 34(320–334), 1947.
  11. Paul Glasserman. Monte Carlo Methods in Financial Engineering, volume 53. Springer, 2004.
  12. Exact estimation for Markov chain equilibrium expectations. Journal of Applied Probability, 51(A):377–389, 2014.
  13. Shin Harase. A table of short-period Tausworthe generators for Markov chain quasi-Monte Carlo. Journal of Computational and Applied Mathematics, 384:113136, 2021.
  14. Shin Harase. A search for short-period Tausworthe generators over Fbsubscript𝐹𝑏F_{b}italic_F start_POSTSUBSCRIPT italic_b end_POSTSUBSCRIPT with application to Markov chain quasi-Monte Carlo. Journal of Statistical Computation and Simulation, pages 1–23, 2024.
  15. Good path generation methods in quasi-Monte Carlo for pricing financial derivatives. SIAM Journal on Scientific Computing, 36(2):B171–B179, 2014.
  16. An integrated quasi-Monte Carlo method for handling high dimensional problems with discontinuities in financial engineering. Computational Economics, 57(2):693–718, 2021.
  17. On the error rate of importance sampling with randomized quasi-Monte Carlo. SIAM Journal on Numerical Analysis, 61(2):515–538, 2023.
  18. A general dimension reduction technique for derivative pricing. Journal of Computational Finance, 10(2):129–155, 2006.
  19. Smoothing with couplings of conditional particle filters. Journal of the American Statistical Association, 115(530):721–729, 2020.
  20. Unbiased Markov chain Monte Carlo methods with couplings. Journal of the Royal Statistical Society Series B: Statistical Methodology, 82(3):543–600, 2020.
  21. J. G. Liao. Variance reduction in Gibbs Sampler using quasi random numbers. Journal of Computational and Graphical Statistics, 7(3):253–266, 1998.
  22. Sifan Liu. Langevin quasi-Monte Carlo. arXiv preprint arXiv:2309.12664, 2023.
  23. Pierre L’Ecuyer. Quasi-Monte Carlo methods with applications in finance. Finance and Stochastics, 13:307–349, 2009.
  24. Nested R^^𝑅\hat{R}over^ start_ARG italic_R end_ARG: Assessing the convergence of Markov chains Monte Carlo when running many short chains. arXiv preprint arXiv:2110.13017, 2022.
  25. Unbiased Markov chain Monte Carlo for intractable target distributions. Electronic Journal of Statistics, 14(2):2842–2891, 2020.
  26. Smoothness and dimension reduction in quasi-Monte Carlo methods. Mathematical and Computer Modelling, 23(8):37–54, 1996.
  27. Radford M Neal. Circularly-coupled Markov chain sampling. arXiv preprint arXiv:1711.04399, 2017.
  28. Coupled MCMC with a randomized acceptance probability. arXiv preprint arXiv:1205.6857, 2012.
  29. Harald Niederreiter. Pseudo-random numbers and optimal coefficients. Advances in Mathematics, 26, 1977.
  30. Harald Niederreiter. Multidimensional numerical integration using pseudorandom numbers. Mathematical Programming Study, 27:17–38, 1986.
  31. Harald Niederreiter. Random Number Generation and Quasi-Monte Carlo Methods. Society for Industrial and Applied Mathematics, 1992.
  32. Art B Owen. Randomly permuted (t,m,s)𝑡𝑚𝑠(t,m,s)( italic_t , italic_m , italic_s )-nets and (t,s)𝑡𝑠(t,s)( italic_t , italic_s )-sequences. In Monte Carlo and Quasi-Monte Carlo Methods in Scientific Computing, pages 299–317. Springer, 1995.
  33. Art B Owen. Multidimensional variation for quasi-Monte Carlo. In Contemporary Multivariate Analysis And Design Of Experiments: In Celebration of Professor Kai-Tai Fang’s 65th Birthday, pages 49–74. World Scientific, 2005.
  34. Art B. Owen. Monte Carlo Theory, Methods and Examples. https://artowen.su.domains/mc/, 2013.
  35. Art B. Owen. Practical Quasi-Monte Carlo Integration. https://artowen.su.domains/mc/practicalqmc.pdf, 2023.
  36. A quasi-Monte Carlo Metropolis algorithm. Proceedings of the National Academy of Sciences, 102(25):8844–8849, 2005.
  37. Monte Carlo Statistical Methods. Springer, 2nd edition, 2004.
  38. I. M. Sobol’. The distribution of points in a cube and the accurate evaluation of integrals. USSR Computational Mathematics and Mathematical Physics, 7(4):86–112, 1967.
  39. Seth D Tribble. Markov chain Monte Carlo algorithms using completely uniformly distributed driving sequences. PhD thesis, Stanford University, 2007.
  40. Construction of weakly CUD sequences for MCMC sampling. Electronic Journal of Statistics, 2(634–660), 2008.
  41. The effective dimension and quasi-Monte Carlo integration. Journal of Complexity, 19(2):101–124, 2003.
  42. Efficient computation of option prices and Greeks by quasi–Monte Carlo method with smoothing and dimension reduction. SIAM Journal on Scientific Computing, 39(2):B298–B322, 2017.
  43. Ye Xiao and Xiaoqun Wang. Enhancing quasi-Monte Carlo simulation by minimizing effective dimension for derivative pricing. Computational Economics, 54:343–366, 2019.
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