Selection models are ubiquitous in statistics. In recent years, they have regained considerable popularity as the working inferential models in many selective inference problems. In this paper, we derive an asymptotic expansion of the local likelihood ratios of selection models. We show that under mild regularity conditions, they are asymptotically equivalent to a sequence of Gaussian selection models. This generalizes the Local Asymptotic Normality framework of Le Cam (1960). Furthermore, we derive the asymptotic shape of Bayesian posterior distributions constructed from selection models, and show that they can be significantly miscalibrated in a frequentist sense.Comment: 14 pages, 1 figur
Ignoring the model selection step in inference after selection is harmful. This paper studies the as...
Observational data analysis is often based on tacit assumptions of ignorability or randomness. The p...
International audienceInference for the parametric distribution of a response given covariates is co...
AbstractBayesian variable selection often assumes normality, but the effects of model misspecificati...
Ignoring the model selection step in inference after selection is harmful. This paper studies the as...
In reading the two articles written by Hjort and Claeskens, readers will � nd several important and ...
Many partial identification problems can be characterized by the optimal value of a function over a ...
Plug-in estimation and corresponding refinements involving penalisation have been considered in vari...
Hjort & Claeskens (2003) developed an asymptotic theory for model selection, model averaging and sub...
grantor: University of TorontoIn this thesis we consider various aspects of asymptotic the...
We consider the problem of estimating the unconditional distribution of a post-model-selection estim...
This paper derives the limiting distributions of least squares averaging estimators for linear regre...
Consider informative selection of a sample from a finite population. Responses are realized as iid r...
We provide a proof of the consistency and asymptotic normality of the estimator suggested by Heckman...
Asymptotic approaches are widely used in statistics. Generally, I recognize two applications of asym...
Ignoring the model selection step in inference after selection is harmful. This paper studies the as...
Observational data analysis is often based on tacit assumptions of ignorability or randomness. The p...
International audienceInference for the parametric distribution of a response given covariates is co...
AbstractBayesian variable selection often assumes normality, but the effects of model misspecificati...
Ignoring the model selection step in inference after selection is harmful. This paper studies the as...
In reading the two articles written by Hjort and Claeskens, readers will � nd several important and ...
Many partial identification problems can be characterized by the optimal value of a function over a ...
Plug-in estimation and corresponding refinements involving penalisation have been considered in vari...
Hjort & Claeskens (2003) developed an asymptotic theory for model selection, model averaging and sub...
grantor: University of TorontoIn this thesis we consider various aspects of asymptotic the...
We consider the problem of estimating the unconditional distribution of a post-model-selection estim...
This paper derives the limiting distributions of least squares averaging estimators for linear regre...
Consider informative selection of a sample from a finite population. Responses are realized as iid r...
We provide a proof of the consistency and asymptotic normality of the estimator suggested by Heckman...
Asymptotic approaches are widely used in statistics. Generally, I recognize two applications of asym...
Ignoring the model selection step in inference after selection is harmful. This paper studies the as...
Observational data analysis is often based on tacit assumptions of ignorability or randomness. The p...
International audienceInference for the parametric distribution of a response given covariates is co...