Nonparametric Bayesian models for a spatial covariance.

A crucial step in the analysis of spatial data is to estimate the spatial correlation function that determines the relationship between a spatial process at two locations. The standard approach to selecting the appropriate correlation function is to use prior knowledge or exploratory analysis, such as a variogram analysis, to select the correct parametric correlation function. Rather that selecting a particular parametric correlation function, we treat the covariance function as an unknown function to be estimated from the data. We propose a flexible prior for the correlation function to provide robustness to the choice of correlation function. We specify the prior for the correlation function using spectral methods and the Dirichlet process prior, which is a common prior for an unknown distribution function. Our model does not require Gaussian data or spatial locations on a regular grid. The approach is demonstrated using a simulation study as well as an analysis of California air pollution data.

[1]  Sw. Banerjee,et al.  Hierarchical Modeling and Analysis for Spatial Data , 2003 .

[2]  J. E. Griffin,et al.  Order-Based Dependent Dirichlet Processes , 2006 .

[3]  Mike Rees,et al.  5. Statistics for Spatial Data , 1993 .

[4]  T. Ferguson A Bayesian Analysis of Some Nonparametric Problems , 1973 .

[5]  Noel A Cressie,et al.  Statistics for Spatial Data. , 1992 .

[6]  Jun Zhu,et al.  Nonparametric Bayesian inference for the spectral density function of a random field , 2010 .

[7]  Brian J. Reich,et al.  A MULTIVARIATE SEMIPARAMETRIC BAYESIAN SPATIAL MODELING FRAMEWORK FOR HURRICANE SURFACE WIND FIELDS , 2007, 0709.0427.

[8]  C. Antoniak Mixtures of Dirichlet Processes with Applications to Bayesian Nonparametric Problems , 1974 .

[9]  Joel Schwartz,et al.  REVIEW OF EPIDEMIOLOGICAL EVIDENCE OF HEALTH EFFECTS OF PARTICULATE AIR POLLUTION , 1995 .

[10]  Carol A. Gotway,et al.  Statistical Methods for Spatial Data Analysis , 2004 .

[11]  J. Schwartz,et al.  Air pollution and daily mortality: a review and meta analysis. , 1994, Environmental research.

[12]  J Schwartz,et al.  Air pollution and daily mortality: associations with particulates and acid aerosols. , 1992, Environmental research.

[13]  Peter D. Hoff,et al.  Nonparametric estimation of convex models via mixtures , 2003 .

[14]  J C Selner,et al.  Asthmatic responses to airborne acid aerosols. , 1991, American journal of public health.

[15]  V. Zadnik,et al.  Effects of Residual Smoothing on the Posterior of the Fixed Effects in Disease‐Mapping Models , 2006, Biometrics.

[16]  S. MacEachern,et al.  Bayesian Nonparametric Spatial Modeling With Dirichlet Process Mixing , 2005 .

[17]  J. Sethuraman A CONSTRUCTIVE DEFINITION OF DIRICHLET PRIORS , 1991 .

[18]  T. Ferguson Prior Distributions on Spaces of Probability Measures , 1974 .

[19]  D. Dunson,et al.  Kernel stick-breaking processes. , 2008, Biometrika.

[20]  D V Bates,et al.  Asthma attack periodicity: a study of hospital emergency visits in Vancouver. , 1990, Environmental research.

[21]  A. Gelfand,et al.  Handbook of spatial statistics , 2010 .