This paper proposes a new heavy-tailed and alternative slash type distribution on a bounded interval via a relation of a slash random variable with respect to the standard logistic function to model the real data set with skewed and high kurtosis which includes the outlier observation. Some basic statistical properties of the newly defined distribution are studied. We derive the maximum likelihood, least-square, and weighted least-square estimations of its parameters. We assess the performance of the estimators of these estimation methods by the simulation study. Moreover, an application to real data demonstrates that the proposed distribution can provide a better fit than well-known bounded distributions in the literature when the skewed d...
This thesis focuses on the analysis of heavy-tailed distributions, which are widely applied to model...
The problem of estimating the tail index in heavy-tailed distributions is very important in a variet...
In this paper, a new class of distributions called the odd log-logistic Burr-X family with two extra...
This article proposes a heavy-tailed distribution for modeling positive data. The proposal arises wi...
WOS: 000262061300038In this paper, we propose a generalization of the multivariate slash distributio...
In this paper, a new heavy-tailed distribution is used to model data with a strong right tail, as of...
During the past couple of years, statistical distributions have been widely used in applied areas su...
In this article, we introduce a generalization of the slash distribution via the gamma-normal distri...
This paper introduces an extension of the slash-elliptical distribution. This new distribution is ge...
In this paper, we introduce an extension for the slash distribution, called double slash distributio...
In this work we introduce a generalization of the slash distribution using beta-normal distribution....
The present paper is a generalization of the recent paper by Nadaraja and Kotz (2003) (Skewed distri...
In this paper we introduce a new distribution, called the modified slash Lindley distribution, which...
We introduce a new class of the slash distribution using the epsilon half normal distribution. The n...
In this paper we introduce a new distribution constructed on the basis of the quotient of two indepe...
This thesis focuses on the analysis of heavy-tailed distributions, which are widely applied to model...
The problem of estimating the tail index in heavy-tailed distributions is very important in a variet...
In this paper, a new class of distributions called the odd log-logistic Burr-X family with two extra...
This article proposes a heavy-tailed distribution for modeling positive data. The proposal arises wi...
WOS: 000262061300038In this paper, we propose a generalization of the multivariate slash distributio...
In this paper, a new heavy-tailed distribution is used to model data with a strong right tail, as of...
During the past couple of years, statistical distributions have been widely used in applied areas su...
In this article, we introduce a generalization of the slash distribution via the gamma-normal distri...
This paper introduces an extension of the slash-elliptical distribution. This new distribution is ge...
In this paper, we introduce an extension for the slash distribution, called double slash distributio...
In this work we introduce a generalization of the slash distribution using beta-normal distribution....
The present paper is a generalization of the recent paper by Nadaraja and Kotz (2003) (Skewed distri...
In this paper we introduce a new distribution, called the modified slash Lindley distribution, which...
We introduce a new class of the slash distribution using the epsilon half normal distribution. The n...
In this paper we introduce a new distribution constructed on the basis of the quotient of two indepe...
This thesis focuses on the analysis of heavy-tailed distributions, which are widely applied to model...
The problem of estimating the tail index in heavy-tailed distributions is very important in a variet...
In this paper, a new class of distributions called the odd log-logistic Burr-X family with two extra...