We empirically show that Bayesian inference can be inconsistent under misspecification in simple linear regression problems, both in a model averaging/selection and in a Bayesian ridge regression setting. We use the standard linear model, which assumes homoskedasticity, whereas the data are heteroskedastic (though, significantly, there are no outliers). As sample size increases, the posterior puts its mass on worse and worse models of ever higher dimension. This is caused by hypercompression, the phenomenon that the posterior puts its mass on distributions that have much larger KL divergence from the ground truth than their average, i.e. the Bayes predictive distribution. To remedy the problem, we equip the likelihood in Bayes’ theorem with...
Modern statistical software and machine learning libraries are enabling semi-automated statistical i...
An important statistical application is the problem of determining an appropriate set of input varia...
Although it is known that Bayesian estimators may fail to converge or may con-verge towards the wron...
We empirically show that Bayesian inference can be inconsistent under misspecification in simple li...
We study generalized Bayesian inference under misspecification, i.e. when the model is `wrong but us...
This thesis explores how a Bayesian should update their beliefs in the knowledge that any model ava...
<p>Bayesian variable selection often assumes normality, but the effects of model misspecification ar...
We study generalized Bayesian inference under misspecification, i.e. when the model is ‘wrong but us...
We consider the standard Bayesian procedure for discrimination, focusing on its tendency to give low...
It is well known that in misspecified parametric models, the maximum likelihood estimator (MLE) is c...
We analyze the behavior of approximate Bayesian computation (ABC) when the model generating the simu...
(A) Aspects of linear regression model assessed by model selection and model averaging. (B) Candidat...
This thesis focuses on sources of error in modern Bayesian analysis and machine learning in the ``bi...
We obtain the prior and posterior probability of a nested regression model as the Hausdorff-integral...
In recent years, with widely accesses to powerful computers and development of new computing methods...
Modern statistical software and machine learning libraries are enabling semi-automated statistical i...
An important statistical application is the problem of determining an appropriate set of input varia...
Although it is known that Bayesian estimators may fail to converge or may con-verge towards the wron...
We empirically show that Bayesian inference can be inconsistent under misspecification in simple li...
We study generalized Bayesian inference under misspecification, i.e. when the model is `wrong but us...
This thesis explores how a Bayesian should update their beliefs in the knowledge that any model ava...
<p>Bayesian variable selection often assumes normality, but the effects of model misspecification ar...
We study generalized Bayesian inference under misspecification, i.e. when the model is ‘wrong but us...
We consider the standard Bayesian procedure for discrimination, focusing on its tendency to give low...
It is well known that in misspecified parametric models, the maximum likelihood estimator (MLE) is c...
We analyze the behavior of approximate Bayesian computation (ABC) when the model generating the simu...
(A) Aspects of linear regression model assessed by model selection and model averaging. (B) Candidat...
This thesis focuses on sources of error in modern Bayesian analysis and machine learning in the ``bi...
We obtain the prior and posterior probability of a nested regression model as the Hausdorff-integral...
In recent years, with widely accesses to powerful computers and development of new computing methods...
Modern statistical software and machine learning libraries are enabling semi-automated statistical i...
An important statistical application is the problem of determining an appropriate set of input varia...
Although it is known that Bayesian estimators may fail to converge or may con-verge towards the wron...