Bayesian Inference for Logistic Models Using Pólya–Gamma Latent Variables

Polson, Nicholas G.; Scott, James G.; Windle, Jesse

doi:10.1080/01621459.2013.829001

Cited by 717 publications

(1,074 citation statements)

References 29 publications

(88 reference statements)

Supporting

Mentioning

1,072

Contrasting

Order By: Relevance

“…With this simple data-augmentation trick from (Polson et al, 2013), the above model can be fit by Gibbs sampling, with the following conditionals. We let − denote all other variables being conditioned upon, and κ (s) = y (s) − m (s) /2.…”

Section: Further Details Of Bayesian Methodsmentioning

confidence: 99%

“…We use the gammalasso because it also has a simple interpretation as a mixture of Laplace priors, making the connection with the graph fused lasso explicit, and because our experiments with other choices led to essentially equivalent performance. We represent the binomial likelihood using the Pólya-Gamma data augmentation scheme described in Polson et al (2013). This yields conditionally conjugate MCMC updates for all model parameters.…”

Section: Detailsmentioning

confidence: 99%

See 1 more Smart Citation

Multiscale Spatial Density Smoothing: An Application to Large-Scale Radiological Survey and Anomaly Detection

Tansey

Athey

Reinhart

et al. 2017

Journal of the American Statistical Association

Self Cite

View full text Add to dashboard Cite

We consider the problem of estimating a spatially varying density function, motivated by problems that arise in large-scale radiological survey and anomaly detection. In this context, the density functions to be estimated are the background gamma-ray energy spectra at sites spread across a large geographical area, such as nuclear production and waste-storage sites, military bases, medical facilities, university campuses, or the downtown of a city. Several challenges combine to make this a difficult problem. First, the spectral density at any given spatial location may have both smooth and nonsmooth features. Second, the spatial correlation in these density functions is neither stationary nor locally isotropic. Finally, at some spatial locations, there is very little data. We present a method called multiscale spatial density smoothing that successfully addresses these challenges. The method is based on recursive dyadic partition of the sample space, and therefore shares much in common with other multiscale methods, such as wavelets and Pólya-tree priors. We describe an efficient algorithm for finding a maximum a posteriori (MAP) estimate that leverages recent advances in convex optimization for non-smooth functions.We apply multiscale spatial density smoothing to real data collected on the background gamma-ray spectra at locations across a large university campus. The method exhibits state-of-the-art performance for spatial smoothing in density estimation, and it leads to substantial improvements in power when used in conjunction with existing methods for detecting the kinds of radiological anomalies that may have important consequences for public health and safety.Key words: radiological survey, density estimation, spatial statistics, Bayesian nonparametrics, total-variation denoising, fused lasso IntroductionLost or stolen radioactive sources present a challenging security problem. Widely used for industrial radiography, sterilization, and medical imaging, these sources are often poorly secured (Gaffigan, 2012) and sometimes stolen (Korshukin and Emery, 2006). To prevent dangerous accidents and to detect radiological dispersal devices (dirty bombs) before they can be used, security agencies are interested in continuously monitoring wide areas for radiation sources. A simple method is to monitor overall radiation levels. But these vary naturally in space, as different soil, stone, and building materials can contain widely different amounts of naturally occurring radioactive materials (NORM). Moreover, different detectors exhibit very different overall sensitivities to radiation. It is therefore more effective to monitor the energy spectrum of the detected radiation instead, as different radioactive materials emit gamma radiation at distinct energies.But to find a spectral anomaly, one must first know what the normal background spectrum looks like at all spatial locations. The background spectrum is the probability distribution for the energy of a gamma ray emitted by natural sources of radiation at a g...

show abstract

Section: Further Details Of Bayesian Methodsmentioning

confidence: 99%

Section: Detailsmentioning

confidence: 99%

Multiscale Spatial Density Smoothing: An Application to Large-Scale Radiological Survey and Anomaly Detection

Tansey

Athey

Reinhart

et al. 2017

Journal of the American Statistical Association

Self Cite

View full text Add to dashboard Cite

show abstract

“…The logistic counterpart of the normal ogive model known as the Rasch model has recently been addressed by Polson et al (2013), who propose a Gibbs sampling procedure for logistic models analog to the data augmentation procedure. The latent responses follow a Polya-Gamma distribution, and if the prior distributions p(θ ) and p(b) are normal distributions, it follows that the posterior distributions of the person and item parameters can again be derived using normal linear model results.…”

Section: Data Augmentationmentioning

confidence: 99%

Complex Latent Variable Modeling in Educational Assessment

Fox

Marsman

Mulder

et al. 2014

Communications in Statistics - Simulation and Computation

View full text Add to dashboard Cite

Bayesian item response theory models have been widely used in different research fields. They support measuring constructs and modeling relationships between constructs, while accounting for complex test situations (e.g., complex sampling designs, missing data, heterogenous population). Advantages of this flexible modeling framework together with powerful simulation-based estimation techniques are discussed. Furthermore, it is shown how the Bayes factor can be used to test relevant hypotheses in assessment using the College Basic Academic Subjects Examination (CBASE) data.

show abstract

“…Separated clusters often result in distinct and more interpretable clusters and the number of clusters are smaller. Previous work has argued that discriminative clustering is desirable in various tasks, e.g., subspace selection analysis [De la Torre and Kanade, 2006;Ye et al, 2008], computer vision [Joulin et al, 2010], unsupervised regression [Krause et al, 2010] and factor modeling [Henao et al, 2014].…”

Section: Introductionmentioning

confidence: 99%

“…As the number of clusters is often unknown and growing over time, modern Bayesian nonparametric (BNP) clustering methods have the advantages of automatically identifying the suitable number of clusters -most popular models include the Dirichlet process mixture models (DPM) [Ferguson, 1973;Antoniak, 1974;Sethuraman, 1994;Ghahramani, 2012]. While DPM and models alike have been successful, they are strictly generative and the clustering outcomes favor the similarity of data points within a cluster, but do not explicitly model the discrimination among clusters.…”

Section: Introductionmentioning

confidence: 99%

Discriminative Bayesian Nonparametric Clustering

Nguyen

Phung

et al. 2017

Proceedings of the Twenty-Sixth International Joint Conference on Artificial Intelligence

View full text Add to dashboard Cite

We propose a general framework for discriminative Bayesian nonparametric clustering to promote the inter-discrimination among the learned clusters in a fully Bayesian nonparametric (BNP) manner. Our method combines existing BNP clustering and discriminative models by enforcing latent cluster indices to be consistent with the predicted labels resulted from probabilistic discriminative model. This formulation results in a well-defined generative process wherein we can use either logistic regression or SVM for discrimination. Using the proposed framework, we develop two novel discriminative BNP variants: the discriminative Dirichlet process mixtures, and the discriminative-state infinite HMMs for sequential data. We develop efficient data-augmentation Gibbs samplers for posterior inference. Extensive experiments in image clustering and dynamic location clustering demonstrate that by encouraging discrimination between induced clusters, our model enhances the quality of clustering in comparison with the traditional generative BNP models.

show abstract

Bayesian Inference for Logistic Models Using Pólya–Gamma Latent Variables

Cited by 717 publications

References 29 publications

Multiscale Spatial Density Smoothing: An Application to Large-Scale Radiological Survey and Anomaly Detection

Multiscale Spatial Density Smoothing: An Application to Large-Scale Radiological Survey and Anomaly Detection

Complex Latent Variable Modeling in Educational Assessment

Discriminative Bayesian Nonparametric Clustering

Contact Info

Product

Resources

About