Bayesian nonparametric spatial modeling with Dirichlet process mixing.
Journal of the American Statistical Association, September, 2005 by Gelfand, Alan E.; Kottas, Athanasios; MacEachern, Steven N.
Customary modeling for continuous point-referenced data assumes a Gaussian process that is often taken to be stationary. When such models are fitted within a Bayesian framework, the unknown parameters of the process are assumed to be random, so a random Gaussian process results. Here we propose a novel spatial Dirichlet process mixture model to produce a random spatial process that is neither Gaussian nor stationary. We first develop a spatial Dirichlet process model for spatial data and discuss its properties. Because of familiar limitations associated with direct use of Dirichlet process models, we introduce mixing by convolving this process with a pure error process. We then examine properties of models created through such Dirichlet process mixing. In the Bayesian framework,...
Most Recent Reference Articles
- ARAB EUROPEAN RELATIONS - Dec 22 - Russia Denies Selling Missile System To Iran
- EGYPT - Dec 29 - Opposition Says Mubarak Blessed Israeli Attacks
- ARAB AFFAIRS - Dec 22 - Syria Will Eventually Move To Direct Talks With Israel
- ARAB AFFAIRS - Dec 30 - GCC Denounces Massacre
- ARAB ISRAELI RELATIONS - Israel Issues An Appeal To Palestinians In Gaza
Most Recent Reference Publications
Most Popular Reference Articles
- How Tyler Perry rose from homelessness to a $5 million mansion
- 9 questions to ask your new lover: what you were afraid to ask, but always wanted to know
- Vickie Winans: at home with the gospel star who lost 75 pounds and reenergized her career
- Free Sex Change? Move To Idaho - Brief Article
- BEST HAIR SALONS in DALLAS, The
