Add to ORKGBasu et al. (1998) proposed the minimum divergence estimating method which is free from using the painful kernel density estimator. Their proposed class of density power divergences is indexed by a single parameter α which controls the trade-off between robustness and efficiency. In this article, (1) we introduce a new large class of the minimum squared distance which includes from the minimum Hellinger distance to the minimum L2 distance. We also show that under certain conditions both the minimum density power divergence estimator(MDPDE) and the minimum squared distance estimator(MSDE) are asymptotically equivalent and (2) in finite samples the MDPDE performs better than the MSDE in general but there are some cases where the MSDE performs...
Euclidean distance is a discrepancy measure between two realvalued functions. Divergence is a discre...
Abstract. A class of robust estimators which are obtained from dual representation of φ-divergences,...
Abstract. A general class of minimum distance estimators for continuous models called minimum dispar...
A minimum divergence estimation method is developed for robust parameter estimation. The proposed ap...
summary:The paper deals with sufficient conditions for the existence of general approximate minimum ...
This paper compares the minimum divergence estimator of Basu et al. (1998) to a competing minimum di...
We approach parameter estimation based on power-divergence using Havrda-Charvat generalized entropy....
Since Beran (1977) developed the minimum Hellinger distance estimation, this method has been a popul...
In this doctoral thesis, we establish a method which aims to improve the maximum likelihood estimato...
The density power divergence, indexed by a single tuning parameter α, has proved to be a very useful...
Minimum density power divergence estimation provides a general framework for robust statistics depen...
Minimum density power divergence estimation provides a general framework for robust statistics, depe...
The aim of robust statistics is to develop statistical procedures which are not unduly influenced by...
Suppose that an estimator f of a density g is not a bona fide density. In 1985 Devroye and Györfi pr...
The aim of robust statistics is to develop statistical procedures which are not unduly influenced by...
Euclidean distance is a discrepancy measure between two realvalued functions. Divergence is a discre...
Abstract. A class of robust estimators which are obtained from dual representation of φ-divergences,...
Abstract. A general class of minimum distance estimators for continuous models called minimum dispar...
A minimum divergence estimation method is developed for robust parameter estimation. The proposed ap...
summary:The paper deals with sufficient conditions for the existence of general approximate minimum ...
This paper compares the minimum divergence estimator of Basu et al. (1998) to a competing minimum di...
We approach parameter estimation based on power-divergence using Havrda-Charvat generalized entropy....
Since Beran (1977) developed the minimum Hellinger distance estimation, this method has been a popul...
In this doctoral thesis, we establish a method which aims to improve the maximum likelihood estimato...
The density power divergence, indexed by a single tuning parameter α, has proved to be a very useful...
Minimum density power divergence estimation provides a general framework for robust statistics depen...
Minimum density power divergence estimation provides a general framework for robust statistics, depe...
The aim of robust statistics is to develop statistical procedures which are not unduly influenced by...
Suppose that an estimator f of a density g is not a bona fide density. In 1985 Devroye and Györfi pr...
The aim of robust statistics is to develop statistical procedures which are not unduly influenced by...
Euclidean distance is a discrepancy measure between two realvalued functions. Divergence is a discre...
Abstract. A class of robust estimators which are obtained from dual representation of φ-divergences,...
Abstract. A general class of minimum distance estimators for continuous models called minimum dispar...