In many applications of highly structured statistical models the likelihood function is in-tractable; in particular, finding the normalisation constant of the distribution can be de-manding. One way to sidestep this problem is to to adopt composite likelihood methods, such as the pseudo-likelihood approach. In this paper we display composite likelihood as a special case of a general estimation technique based on proper scoring rules, which supply an unbiased estimating equation for any statistical model. The important class of key local scoring rules avoids the need to compute normalising constants. Another application arises in Bayesian model selection. The log Bayes factor measures by how much the predictive log score for one model improv...
Both approximate Bayesian computation (ABC) and composite likelihood methods are useful for Bayesian...
We investigate proper scoring rules for continuous distributions on the real line. It is known that ...
Suppose to express the uncertainty about an unobserved quantity $X \in \mathcal{X}$ by quoting a dis...
In many applications of highly structured statistical models the likelihood function is intractable;...
We display pseudo-likelihood as a special case of a general estimation technique based on proper sco...
Ascoring rule S(x; q) provides away of judging the quality of a quoted probability density q for a r...
We display pseudo-likelihood as a special case of a general estimation technique based on proper sco...
A scoring rule is a loss function measuring the quality of a quoted probability distribution $Q$ for...
Standard Bayesian analyses can be difficult to perform when the full likelihood, and consequently th...
Proper scoring rules are devices for encouraging honest assessment of probability distributions. Jus...
A scoring rule is a principled way of assessing a probabilistic forecast. The key requirement of a s...
We investigate proper scoring rules for continuous distributions on the real line. It is known that ...
The role played by the composite analogue of the log likelihood ratio in hypothesis testing and in s...
We propose pseudo-score confidence intervals for parameters in models for discrete data. The confide...
We consider homogeneous scoring rules for selecting between Bayesian models for discrete data with p...
Both approximate Bayesian computation (ABC) and composite likelihood methods are useful for Bayesian...
We investigate proper scoring rules for continuous distributions on the real line. It is known that ...
Suppose to express the uncertainty about an unobserved quantity $X \in \mathcal{X}$ by quoting a dis...
In many applications of highly structured statistical models the likelihood function is intractable;...
We display pseudo-likelihood as a special case of a general estimation technique based on proper sco...
Ascoring rule S(x; q) provides away of judging the quality of a quoted probability density q for a r...
We display pseudo-likelihood as a special case of a general estimation technique based on proper sco...
A scoring rule is a loss function measuring the quality of a quoted probability distribution $Q$ for...
Standard Bayesian analyses can be difficult to perform when the full likelihood, and consequently th...
Proper scoring rules are devices for encouraging honest assessment of probability distributions. Jus...
A scoring rule is a principled way of assessing a probabilistic forecast. The key requirement of a s...
We investigate proper scoring rules for continuous distributions on the real line. It is known that ...
The role played by the composite analogue of the log likelihood ratio in hypothesis testing and in s...
We propose pseudo-score confidence intervals for parameters in models for discrete data. The confide...
We consider homogeneous scoring rules for selecting between Bayesian models for discrete data with p...
Both approximate Bayesian computation (ABC) and composite likelihood methods are useful for Bayesian...
We investigate proper scoring rules for continuous distributions on the real line. It is known that ...
Suppose to express the uncertainty about an unobserved quantity $X \in \mathcal{X}$ by quoting a dis...