Neveka M. Olmos scite author profile

In actuarial statistics, distributions with heavy tails are of great interest to actuaries, as they represent a better description of risk exposure through a type of indicator with a certain probability. These risk indicators are used to determine companies’ exposure to a particular risk. In this paper, we present a distribution with heavy right tail, studying its properties and the behaviour of the tail. We estimate the parameters using the maximum likelihood method and evaluate the performance of these estimators using Monte Carlo. We analyse one set of simulated data and another set of real data, showing that the distribution studied can be used to model income data.

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Modified Generalized Half-Normal Distribution with Application to Lifetimes

Olmos¹,

Venegas²

2018

Appl. Math. Inf. Sci

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Inference for a truncated positive normal distribution

Gómez

Olmos

Varela

et al. 2018

Appl. Math. J. Chin. Univ.

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An Asymmetric Distribution with Heavy Tails and Its Expectation–Maximization (EM) Algorithm Implementation

et al. 2019

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In this paper we introduce a new distribution constructed on the basis of the quotient of two independent random variables whose distributions are the half-normal distribution and a power of the exponential distribution with parameter 2 respectively. The result is a distribution with greater kurtosis than the well known half-normal and slashed half-normal distributions. We studied the general density function of this distribution, with some of its properties, moments, and its coefficients of asymmetry and kurtosis. We developed the expectation–maximization algorithm and present a simulation study. We calculated the moment and maximum likelihood estimators and present three illustrations in real data sets to show the flexibility of the new model.

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Confluent hypergeometric slashed-Rayleigh distribution: Properties, estimation and applications

Olmos

Venegas

Gómez

et al. 2020

Journal of Computational and Applied Mathematics

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Neveka M. Olmos

An extension of the half-normal distribution

Bimodal Birnbaum–Saunders distribution with applications to non negative measurements

An extension of the generalized half-normal distribution

The Heavy-Tailed Gleser Model: Properties, Estimation, and Applications

Modified Generalized Half-Normal Distribution with Application to Lifetimes

Inference for a truncated positive normal distribution

An Asymmetric Distribution with Heavy Tails and Its Expectation–Maximization (EM) Algorithm Implementation

Confluent hypergeometric slashed-Rayleigh distribution: Properties, estimation and applications

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