%0 Journal Article %1 1992 %A Geyer, Charles J. %A Thompson, Elizabeth A. %D 1992 %I Wiley for the Royal Statistical Society %J Journal of the Royal Statistical Society. Series B (Methodological) %K Ising_model MCMC autologistic_model likelihood pseudolikelihood statistics %N 3 %P pp. 657-699 %T Constrained Monte Carlo Maximum Likelihood for Dependent Data %U http://www.jstor.org/stable/2345852 %V 54 %X Maximum likelihood estimates (MLEs) in autologistic models and other exponential family models for dependent data can be calculated with Markov chain Monte Carlo methods (the Metropolis algorithm or the Gibbs sampler), which simulate ergodic Markov chains having equilibrium distributions in the model. From one realization of such a Markov chain, a Monte Carlo approximant to the whole likelihood function can be constructed. The parameter value (if any) maximizing this function approximates the MLE. When no parameter point in the model maximizes the likelihood, the MLE in the closure of the exponential family may exist and can be calculated by a two-phase algorithm, first finding the support of the MLE by linear programming and then finding the distribution within the family conditioned on the support by maximizing the likelihood for that family. These methods are illustrated by a constrained autologistic model for DNA fingerprint data. MLEs are compared with maximum pseudolikelihood estimates (MPLEs) and with maximum conditional likelihood estimates (MCLEs), neither of which produce acceptable estimates, the MPLE because it overestimates dependence, and the MCLE because conditioning removes the constraints.

@article{1992, abstract = {Maximum likelihood estimates (MLEs) in autologistic models and other exponential family models for dependent data can be calculated with Markov chain Monte Carlo methods (the Metropolis algorithm or the Gibbs sampler), which simulate ergodic Markov chains having equilibrium distributions in the model. From one realization of such a Markov chain, a Monte Carlo approximant to the whole likelihood function can be constructed. The parameter value (if any) maximizing this function approximates the MLE. When no parameter point in the model maximizes the likelihood, the MLE in the closure of the exponential family may exist and can be calculated by a two-phase algorithm, first finding the support of the MLE by linear programming and then finding the distribution within the family conditioned on the support by maximizing the likelihood for that family. These methods are illustrated by a constrained autologistic model for DNA fingerprint data. MLEs are compared with maximum pseudolikelihood estimates (MPLEs) and with maximum conditional likelihood estimates (MCLEs), neither of which produce acceptable estimates, the MPLE because it overestimates dependence, and the MCLE because conditioning removes the constraints.}, added-at = {2014-10-31T18:35:50.000+0100}, author = {Geyer, Charles J. and Thompson, Elizabeth A.}, biburl = {https://www.bibsonomy.org/bibtex/25e2875acb8e6cbd2ba52a8f83faed975/peter.ralph}, interhash = {916821eda342c57bb914b622b75c5e8e}, intrahash = {5e2875acb8e6cbd2ba52a8f83faed975}, issn = {00359246}, journal = {Journal of the Royal Statistical Society. Series B (Methodological)}, keywords = {Ising_model MCMC autologistic_model likelihood pseudolikelihood statistics}, number = 3, pages = {pp. 657-699}, publisher = {Wiley for the Royal Statistical Society}, timestamp = {2014-10-31T18:35:50.000+0100}, title = {Constrained {Monte} {Carlo} Maximum Likelihood for Dependent Data}, url = {http://www.jstor.org/stable/2345852}, volume = 54, year = 1992 }