Higher-order likelihood methods often give very accurate results. A way to evaluate accuracy is the compaidson of the solutions with the exact ones of the classical theory, when these exist. To this end, we consider inference for a scalar regression parameter in the normal regression setting. In particular, we compare confidence intervals computed from the likelihood and its higher-order modifications with the ones based on the Student t distribution. It is shown that higher-order likelihood methods give accurate approximations to exact results
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
We present improved methods for calculating confidence intervals and p values in situations where st...
Likelihood-based approaches, including profile-likelihood, signed- likelihood, sample deviance and p...
grantor: University of TorontoIn this thesis, we develop a simple general formula for appr...
Adjusted profile likelihoods, confidence interval, higher-order asymptotics, modified directed likel...
We discuss the effects of model misspecifications on higher-order asymptotic approximations of the ...
This paper focuses on the application of higher-order asymptotics for likelihood-based inference to ...
By the modified directed likelihood, higher order accurate confidence limits for a scalar parameter ...
This paper investigates the use of likelihood methods for meta-analysis, within the random-effects m...
Modern higher-order asymptotic theory for frequency inference, as largely described in Barn-dorff-Ni...
Practical use of modern likelihood asymptotics is still limited by the lack of flexible and easy to ...
Practical use of modern likelihood asymptotics is still limited by the lack of flexible and easy to ...
The stress-strength reliability , where and are independent continuous random variables, has obtaine...
This paper presents discussion of properties of asymptotic confidence intervals based on a normalizi...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
We present improved methods for calculating confidence intervals and p values in situations where st...
Likelihood-based approaches, including profile-likelihood, signed- likelihood, sample deviance and p...
grantor: University of TorontoIn this thesis, we develop a simple general formula for appr...
Adjusted profile likelihoods, confidence interval, higher-order asymptotics, modified directed likel...
We discuss the effects of model misspecifications on higher-order asymptotic approximations of the ...
This paper focuses on the application of higher-order asymptotics for likelihood-based inference to ...
By the modified directed likelihood, higher order accurate confidence limits for a scalar parameter ...
This paper investigates the use of likelihood methods for meta-analysis, within the random-effects m...
Modern higher-order asymptotic theory for frequency inference, as largely described in Barn-dorff-Ni...
Practical use of modern likelihood asymptotics is still limited by the lack of flexible and easy to ...
Practical use of modern likelihood asymptotics is still limited by the lack of flexible and easy to ...
The stress-strength reliability , where and are independent continuous random variables, has obtaine...
This paper presents discussion of properties of asymptotic confidence intervals based on a normalizi...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
We outline how modern likelihood theory, which provides essentially exact inferences in a variety of...
We present improved methods for calculating confidence intervals and p values in situations where st...