The art of fitting gamma distributions robustly is described. In particular we compare methods of fitting via minimizing a Cramér Von Mises distance, an L 2 minimum distance estimator, and fitting a B-optimal M-estimator. After a brief prelude on robust estimation explaining the merits in terms of weak continuity and Fréchet differentiability of all the aforesaid estimators from an asymptotic point of view, a comparison is drawn with classical estimation and fitting. In summary, we give a practical example where minimizing a Cramér Von Mises distance is both efficacious in terms of efficiency and robustness as well as being easily implemented. Here gamma distributions arise naturally for "in control" representation indicators from measureme...
AbstractBounds for the maximum likelihood estimator (MLE) of the shape parameter of the two-paramete...
This paper derives the minimum variance unbiased estimate of the reliability function associated wit...
This paper proposes a new goodness-of-fit for the two-parameter distribution. It is based on a funct...
The art of fitting gamma distributions robustly is described. In particular we compare methods of fi...
This paper discusses new approaches to parameter estimation of gamma distribution based on represent...
The gamma distribution arises frequently in Bayesian models, but there is not an easy-to-use conjuga...
It is well-known that maximum likelihood (ML) estimators of the two parame- ters in a Gamma distribu...
Inferential methods for constructing an upper confidence limit for an upper percentile and for findi...
We provide an estimation procedure of the two-parameter Gamma distribution based on the Algorithmic ...
The gamma distribution is one of the most important parametric models in probability theory and stat...
International audienceThis article focuses on the parameter estimation of the generalized gamma dist...
For a given data set the problem of selecting either log-normal or gamma distribu-tion with unknown ...
In this paper, we introduce the record values arising from gamma distribution with three parameters....
This article introduces a new probability distribution capable of modeling positive data that presen...
The gamma distribution is often used to model data with right skewness. Smooth tests of goodness of ...
AbstractBounds for the maximum likelihood estimator (MLE) of the shape parameter of the two-paramete...
This paper derives the minimum variance unbiased estimate of the reliability function associated wit...
This paper proposes a new goodness-of-fit for the two-parameter distribution. It is based on a funct...
The art of fitting gamma distributions robustly is described. In particular we compare methods of fi...
This paper discusses new approaches to parameter estimation of gamma distribution based on represent...
The gamma distribution arises frequently in Bayesian models, but there is not an easy-to-use conjuga...
It is well-known that maximum likelihood (ML) estimators of the two parame- ters in a Gamma distribu...
Inferential methods for constructing an upper confidence limit for an upper percentile and for findi...
We provide an estimation procedure of the two-parameter Gamma distribution based on the Algorithmic ...
The gamma distribution is one of the most important parametric models in probability theory and stat...
International audienceThis article focuses on the parameter estimation of the generalized gamma dist...
For a given data set the problem of selecting either log-normal or gamma distribu-tion with unknown ...
In this paper, we introduce the record values arising from gamma distribution with three parameters....
This article introduces a new probability distribution capable of modeling positive data that presen...
The gamma distribution is often used to model data with right skewness. Smooth tests of goodness of ...
AbstractBounds for the maximum likelihood estimator (MLE) of the shape parameter of the two-paramete...
This paper derives the minimum variance unbiased estimate of the reliability function associated wit...
This paper proposes a new goodness-of-fit for the two-parameter distribution. It is based on a funct...