The first- and second-order large-deviation efficiency is discussed for an exponential family of distributions. The lower bound for the tail probability of asymptotically median unbiased estimators is directly derived up to the second order by use of the saddlepoint approximation. The maximum likelihood estimator (MLE) is also shown to be second-order large-deviation efficient in the sense that the MLE attains the lower bound. Further, in certain curved exponential models, the first- and second-order lower bounds are obtained, and the MLE is shown not to be first-order large-deviation efficient
AbstractIn this paper the maximum likelihood and quasi-maximum likelihood estimators of a spectral p...
Consider a family of probabilities for which the decay is governed by a large deviation principle. T...
Maximum likelihood estimation is a standard approach when confronted with the task of finding estima...
AbstractBased on concentration probability of estimators about a true parameter, third-order asympto...
In this article, we consider several statistical models for censored exponential data. We prove a la...
In this article, we consider several statistical models for censored exponential data. We prove a la...
Based on concentration probability of estimators about a true parameter, third-order asymptotic effi...
The asymptotic relative efficiency (ARE) of the rounded sample median M[subscript][epsilon] with res...
We prove the large deviation principle (LDP) for posterior distributions arising from subfamilies of...
This paper presents a general approach to statistical problems with criteria based on probabilities ...
For a truncated exponential family of distributions with a natural parameter θ and a truncation para...
AbstractLet P(Θ, τ) ‖ A, θ ∈ Θ ⊂ R, τ ∈ T ⊂ Rp denote a family of probability measures, where τ deno...
this article. 1. Introduction The Fisher-Rao theorem [Fisher (1925) and Rao (1961, 1962)] states tha...
The performance of a sequence of estimators $\{T_n\}$ of $g(\theta)$ can be measured by its inaccura...
For a one-sided truncated exponential family of distributions with a natural parameter. and a trunca...
AbstractIn this paper the maximum likelihood and quasi-maximum likelihood estimators of a spectral p...
Consider a family of probabilities for which the decay is governed by a large deviation principle. T...
Maximum likelihood estimation is a standard approach when confronted with the task of finding estima...
AbstractBased on concentration probability of estimators about a true parameter, third-order asympto...
In this article, we consider several statistical models for censored exponential data. We prove a la...
In this article, we consider several statistical models for censored exponential data. We prove a la...
Based on concentration probability of estimators about a true parameter, third-order asymptotic effi...
The asymptotic relative efficiency (ARE) of the rounded sample median M[subscript][epsilon] with res...
We prove the large deviation principle (LDP) for posterior distributions arising from subfamilies of...
This paper presents a general approach to statistical problems with criteria based on probabilities ...
For a truncated exponential family of distributions with a natural parameter θ and a truncation para...
AbstractLet P(Θ, τ) ‖ A, θ ∈ Θ ⊂ R, τ ∈ T ⊂ Rp denote a family of probability measures, where τ deno...
this article. 1. Introduction The Fisher-Rao theorem [Fisher (1925) and Rao (1961, 1962)] states tha...
The performance of a sequence of estimators $\{T_n\}$ of $g(\theta)$ can be measured by its inaccura...
For a one-sided truncated exponential family of distributions with a natural parameter. and a trunca...
AbstractIn this paper the maximum likelihood and quasi-maximum likelihood estimators of a spectral p...
Consider a family of probabilities for which the decay is governed by a large deviation principle. T...
Maximum likelihood estimation is a standard approach when confronted with the task of finding estima...