By representing fair betting odds according to one or more pairs of confidence set estimators, dual parameter distributions called confidence posteriors secure the coherence of actions without any prior distribution. This theory reduces to the maximization of expected utility when the pair of posteriors is induced by an exact or approximate confidence set estimator or when a reduction rule is applied to the pair. Unlike the p-value, the confidence posterior probability of an interval hypothesis is suitable as an estimator of the indicator of hypothesis truth since it converges to 1 if the hypothesis is true or to 0 otherwise
It is well known that one of the conflicts between Bayesian and frequentist approach to inference li...
It is well-known that classical p-values sometimes behave incoherently for testing hypotheses in the...
Coherent reasoning under uncertainty can be represented in a very general manner by coherent sets of...
By representing the range of fair betting odds according to a pair of confidence set estimators, dua...
Independent data are efficiently integrated by adding their respective log-likelihoods. Instead of B...
In its orthodoxy standard frequentist statistics deals only with aleatory probability, suppressing t...
The reasoning behind uses of confidence intervals and p-values in scientific practice may be made co...
Frequentist methods, without the coherence guarantees of fully Bayesian methods, are known to yield ...
Abstract Null hypothesis significance testing is generalized by controlling the Type I error rate c...
Summary In frequentist inference, we commonly use a single point (point estimator) or an interval (c...
In inference about set-identified parameters, it is known that the Bayesian probability state- ments...
A frequentist simultaneous confidence interval procedure requires the predetermination of the compar...
Bayesians have a seemingly attractive account of rational credal states in terms of coherence. An ag...
To the frequentist who computes posteriors, not all priors are useful asymptotically: in this paper,...
In this paper the theoretical and practical implications of dropping -from the basic Bayesian cohere...
It is well known that one of the conflicts between Bayesian and frequentist approach to inference li...
It is well-known that classical p-values sometimes behave incoherently for testing hypotheses in the...
Coherent reasoning under uncertainty can be represented in a very general manner by coherent sets of...
By representing the range of fair betting odds according to a pair of confidence set estimators, dua...
Independent data are efficiently integrated by adding their respective log-likelihoods. Instead of B...
In its orthodoxy standard frequentist statistics deals only with aleatory probability, suppressing t...
The reasoning behind uses of confidence intervals and p-values in scientific practice may be made co...
Frequentist methods, without the coherence guarantees of fully Bayesian methods, are known to yield ...
Abstract Null hypothesis significance testing is generalized by controlling the Type I error rate c...
Summary In frequentist inference, we commonly use a single point (point estimator) or an interval (c...
In inference about set-identified parameters, it is known that the Bayesian probability state- ments...
A frequentist simultaneous confidence interval procedure requires the predetermination of the compar...
Bayesians have a seemingly attractive account of rational credal states in terms of coherence. An ag...
To the frequentist who computes posteriors, not all priors are useful asymptotically: in this paper,...
In this paper the theoretical and practical implications of dropping -from the basic Bayesian cohere...
It is well known that one of the conflicts between Bayesian and frequentist approach to inference li...
It is well-known that classical p-values sometimes behave incoherently for testing hypotheses in the...
Coherent reasoning under uncertainty can be represented in a very general manner by coherent sets of...