https://orcid.org/0000-0001-6159-2650
References
- Arbel, J., and Prünster, I. (2017), “A Moment-Matching Ferguson & Klass Algorithm,” Statistics and Computing, 27, 3–17.
- Argiento, R., and De Iorio, M. (in press), “Is Infinity That Far? A Bayesian Nonparametric Perspective of Finite Mixture Models,” Annals of Statistics.
- Barrios, E., Lijoi, A., Nieto-Barajas, L. E., and Prünster, I. (2013), “Modeling with Normalized Random Measure Mixture Models,” Statistical Science, 28, 313–334. DOI: 10.1214/13-STS416.
- Brix, A. (1999), “Generalized Gamma Measures and Shot-Noise Cox Processes,” Advances in Applied Probability, 31, 929–953. DOI: 10.1239/aap/1029955251.
- Camerlenghi, F., Lijoi, A., and Prünster, I. (2018), “Bayesian Nonparametric Inference Beyond the Gibbs-type Framework,” Scandinavian Journal of Statistics, 45, 1062–1091. DOI: 10.1111/sjos.12334.
- Canale, A., Lijoi, A., Nipoti, B., and Prünster, I. (2017), “On the Pitman–Yor Process with Spike and Slab Base Measure,” Biometrika, 104, 681–697. DOI: 10.1093/biomet/asx041.
- Caron, F., and Fox, E. B. (2017), “Sparse Graphs Using Exchangeable Random Measures,” Journal of the Royal Statistical Society, Series B, 79, 1295–1366. DOI: 10.1111/rssb.12233.
- De Blasi, P., Favaro, S., Lijoi, A., Mena, R. H., Prünster, I., and Ruggiero, M. (2015), “Are Gibbs-type Priors the Most Natural Generalization of the Dirichlet Process?” IEEE Transactions on Pattern Analysis and Machine Intelligence, 37, 212–229. DOI: 10.1109/TPAMI.2013.217.
- De Blasi, P., and Gyl-Leyva, M. F. (2021), “Gibbs Sampling for Mixtures in Order of Appearance: The Ordered Allocation Sampler.” arXiv:2107.08380.
- De Blasi, P., Lijoi, A., and Prünster, I. (2013), “An Asymptotic Analysis of a Class of Discrete Nonparametric Priors,” Statistica Sinica, 23, 1299–1321. DOI: 10.5705/ss.2012.047.
- Dunson, D. B., Herring, A. H., and Siega-Riz, A. M. (2008), “Bayesian Inference on Changes in Response Densities Over Predictor Clusters,” Journal of the American Statistical Association, 103, 1508–1517. DOI: 10.1198/016214508000001039.
- Durante, D., and Dunson, D. B. (2018), “Bayesian Inference and Testing of Group Differences in Brain Networks,” Bayesian Analysis, 13, 29–58. DOI: 10.1214/16-BA1030.
- Durante, D., Dunson, D. B., and Vogelstein, J. T. (2017), “Nonparametric Bayes Modeling of Populations of Networks,” Journal of the American Statistical Association, 112, 1516–1530. DOI: 10.1080/01621459.2016.1219260.
- Favaro, S., Hadjicharalambous, G., and Prünster, I.(2011), “On a Class of Distributions on the Simplex,” Journal of Statistical Planning and Inference, 141, 2987–3004. DOI: 10.1016/j.jspi.2011.03.015.
- Favaro, S., and Teh, Y. W. (2013), “MCMC for Normalized Random Measure Mixture Models,” Statistical Science, 28, 335–359. DOI: 10.1214/13-STS422.
- Ferguson, T. S., and Klass, M. J. (1972), “A Representation of Independent Increment Processes without Gaussian Components,” Annals of Mathematical Statistics, 43, 1634—1643. DOI: 10.1214/aoms/1177692395.
- Frühwirth-Schnatter, S., Malsiner-Walli, G., and Grün, B. (2021), “Generalized Mixtures of Finite Mixtures and Telescoping Sampling,” Bayesian Analysis, 16, 1279–1307. DOI: 10.1214/21-BA1294.
- Gelman, A., Hwang, J., and Vehtari, A. (2014), “Understanding Predictive Information Criteria for Bayesian Models,” Statistics and Computing, 24, 997–1016. DOI: 10.1007/s11222-013-9416-2.
- Gnedin, A., and Pitman, J. (2005), “Exchangeable Gibbs partitions and Stirling triangles,” Zapiski Nauchnykh Seminarov, POMI, 325, 83–102.
- Green, P. J., and Richardson, S. (2001), “Modelling Heterogeneity with and without the Dirichlet Process,” Scandinavian Journal of Statistics, 28, 355–375. DOI: 10.1111/1467-9469.00242.
- Ishwaran, H., and Zarepour, M. (2002), “Exact and Approximate Sum Representations for the Dirichlet Process,” Canadian Journal of Statistics, 30, 269–283. DOI: 10.2307/3315951.
- James, L. F., Lijoi, A., and Prünster, I. (2006), “Conjugacy as a Distinctive Feature of the Dirichlet Process,” Scandinavian Journal of Statistics, 33, 105–120. DOI: 10.1111/j.1467-9469.2005.00486.x.
- ——— (2009), “Posterior Analysis for Normalized Random Measures with Independent Increments,” Scandinavian Journal of Statistics, 36, 76–97.
- Kallenberg, O. (2017), Random Measures, Theory and Applications. New York: Springer.
- Kingman, J. F. C. (1975), “Random Discrete Distributions,” Journal of the Royal Statistical Society, Series B, 37, 1–22. DOI: 10.1111/j.2517-6161.1975.tb01024.x.
- Legramanti, S., Rigon, T., Durante, D., and Dunson, D. B. (2022), “Extended Stochastic Block Models with Application to Criminal Networks,” Annals of Applied Statistics, 16, 2369–2395. DOI: 10.1214/21-AOAS1595.
- Lijoi, A., Mena, R. H., and Prünster, I. (2005), “Hierarchical Mixture Modeling with Normalized Inverse-Gaussian Priors,” Journal of the American Statistical Association, 100, 1278–1291. DOI: 10.1198/016214505000000132.
- ——— (2007), “Controlling the Reinforcement in Bayesian Non-Parametric Mixture Models,” Journal of the Royal Statistical Society, Series B, 69, 715–740.
- Lijoi, A., and Prünster, I. (2010), “Models beyond the Dirichlet Process,” in Bayesian Nonparametrics, eds. N. L. Hjort, C. C. Holmes, P. Muller, and S. G. Walker, pp. 80–136, Cambridge: Cambridge University Press.
- Malsiner-Walli, G., Frühwirth-Schnatter, S., and Grün, B. (2016), “Model-based Clustering Based on Sparse Finite Gaussian Mixtures,” Statistics and Computing, 26, 303–324. DOI: 10.1007/s11222-014-9500-2.
- Miller, J. W., and Harrison, M. T. (2018), “Mixture Models with a Prior on the Number of Components,” Journal of the American Statistical Association, 113, 340–356. DOI: 10.1080/01621459.2016.1255636.
- Nguyen, T. D., Huggins, J., Masoero, L., Mackey, L., and Broderick, T. (2021), “Independent Finite Approximations for Bayesian Nonparametric Inference.” arXiv:2009.1078v3 .
- Nguyen, X. (2013), “Convergence of Latent Mixing Measures in Finite and Infinite Mixture Models,” The Annals of Statistics, 41, 370–400. DOI: 10.1214/12-AOS1065.
- Nobile, A. (2004), “On the Posterior Distribution of the Number of Components in a Finite Mixture,” Annals of Statistics, 32, 2044–2073.
- Petrone, S., Guindani, M., and Gelfand, A. E. (2009), “Hybrid Dirichlet Mixture Models for Functional Data,” Journal of the American Statistical Association, 71, 755–782.
- Pitman, J. (1996), “Some Developments of the Blackwell-Macqueen Urn Scheme,” in Statistics, Probability and Game Theory, eds. T. S. Ferguson, L. S. Shapley, and J. B. MacQueen, pp. 245–267, Institute of Mathematical Statistics.
- Pitman, J., and Yor, M. (1997), “The Two-parameter Poisson-Dirichlet Distribution Derived from a Stable Subordinator”, The Annals of Probability, 25, 855–900. DOI: 10.1214/aop/1024404422.
- Regazzini, E., Lijoi, A., and Prünster, I. (2003), “Distributional Results for Means of Normalized Random Measures with Independent Increments,” Annals of Statistics, 31, 560–585.
- Richardson, S., and Green, P. J. (1997), “On Bayesian Analysis of Mixtures with an Unknown Number of Components,” Journal of the Royal Statistical Society, Series B, 59, 768–769.
- Ridout, M. S. (2009), “Generating Random Numbers from a Distribution Specified by Its Laplace Transform,” Statistics and Computing, 19, 439–450. DOI: 10.1007/s11222-008-9103-x.
- Rigon, T., Durante, D., and Torelli, N. (2019), “Bayesian Semiparametric Modelling of Contraceptive Behaviour in India Via Sequential Logistic Regressions,” Journal of the Royal Statistical Society, Series A, 182, 225–247. DOI: 10.1111/rssa.12361.
- Rousseau, J., and Mengersen, K. (2011), “Asymptotic Behaviour of the Posterior Distribution in Overfitted Mixture Models,” Journal of the Royal Statistical Society, Series B, 73, 689–710. DOI: 10.1111/j.1467-9868.2011.00781.x.
- Vehtari, A., Gelman, A., and Gabry, J. (2017), “Practical Bayesian Model Evaluation Using Leave-One-Out Cross-Validation and WAIC,” Statistics and Computing, 27, 1413–1432. DOI: 10.1007/s11222-016-9696-4.
- Xu, Y., Müller, P., and Telesca, D. (2016), “Bayesian Inference for Latent Biologic Structure with Determinantal Point Processes (DPP),” Biometrics, 72, 955–964. DOI: 10.1111/biom.12482.