Asymptotic formulae for the distribution of M-estimators, i.e. maximum likelihood type estimators, of location, including the arithmetic mean, are derived which numerical studies show to give relative errors for densities and tail areas of the order of magnitude of 1% down to sample sizes 3 and 4 even in the extreme tails. The paper is the continuation of earlier work by the second author and is also closely related to Daniels's work on the saddlepoint approximation. The method consists in expanding the derivative of the logarithm of the unstandardized density of the estimator in powers of 1/n at each point, using recentring by means of conjugate distributions. This method yields a unified point of view for the comparison of other asymptoti...
Asymptotic approaches are widely used in statistics. Generally, I recognize two applications of asym...
The empirical saddlepoint distribution provides an approximation to the sampling distributions for t...
The saddlepoint approximation as developed by Daniels [3] is an extremely accurate method for approx...
Asymptotic formulae for the distribution of M-estimators, i.e. maximum likelihood type estimators, o...
In this thesis we study the small sample asymptotics. We introduce the saddlepoint approximation whi...
grantor: University of TorontoWe examine the implications of using estimated cumulants in ...
The aim of this paper is to review concepts, theory, and applications of small sample asymptotic tec...
We review some first-and higher-order asymptotic techniques for M-estimators and we study their stab...
Title: Statistical inference based on saddlepoint approximations Author: Radka Sabolová Abstract: Th...
Edgeworth expansions as well as saddle-point methods are used to approximate the distributions of so...
Chapter two derives saddlepoint approximations for the density and distribution of a ratio of non-ce...
To derive the exact density of a statistic, which can be intractable, is sometimes a difficult probl...
Saddlepoint approximations are powerful tools for obtaining accurate expressions for densities and d...
The saddlepoint method provides accurate approximations for the distributions of many test statistic...
This article considers the random walk over Rp, with p ≥ 2, where the directions taken by the indivi...
Asymptotic approaches are widely used in statistics. Generally, I recognize two applications of asym...
The empirical saddlepoint distribution provides an approximation to the sampling distributions for t...
The saddlepoint approximation as developed by Daniels [3] is an extremely accurate method for approx...
Asymptotic formulae for the distribution of M-estimators, i.e. maximum likelihood type estimators, o...
In this thesis we study the small sample asymptotics. We introduce the saddlepoint approximation whi...
grantor: University of TorontoWe examine the implications of using estimated cumulants in ...
The aim of this paper is to review concepts, theory, and applications of small sample asymptotic tec...
We review some first-and higher-order asymptotic techniques for M-estimators and we study their stab...
Title: Statistical inference based on saddlepoint approximations Author: Radka Sabolová Abstract: Th...
Edgeworth expansions as well as saddle-point methods are used to approximate the distributions of so...
Chapter two derives saddlepoint approximations for the density and distribution of a ratio of non-ce...
To derive the exact density of a statistic, which can be intractable, is sometimes a difficult probl...
Saddlepoint approximations are powerful tools for obtaining accurate expressions for densities and d...
The saddlepoint method provides accurate approximations for the distributions of many test statistic...
This article considers the random walk over Rp, with p ≥ 2, where the directions taken by the indivi...
Asymptotic approaches are widely used in statistics. Generally, I recognize two applications of asym...
The empirical saddlepoint distribution provides an approximation to the sampling distributions for t...
The saddlepoint approximation as developed by Daniels [3] is an extremely accurate method for approx...