A new generalization of the logarithmic series distribution

A new generalization of the logarithmic series distribution has been obtained as a limiting case of the zero-truncated Mishra’s [10] generalized negative binomial distribution (GNBD). This distribution has an advantage over the Mishra’s [9] quasi logarithmic series distribution (QLSD) as its moments appear in compact forms unlike the QLSD. This makes the estimation of parameters easier by the method of moments. The first four moments of this distribution have been obtained and the distribution has been fitted to some well known data-sets to test its goodness of fit.

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A Generalised Poisson Mishra Distribution

Nepalese Journal of Statistics ◽

10.3126/njs.v2i0.21153 ◽

2018 ◽

Vol 2 ◽

pp. 27-36

Author(s):

Binod Kumar Sah

Keyword(s):

Poisson Distribution ◽

Negative Binomial ◽

Mass Function ◽

Discrete Data ◽

P Value ◽

Probability Mass Function ◽

Data Sets ◽

Estimation Of Parameters ◽

First Moment ◽

First Four Moments

Background: “Mishra distribution" of B. K. Sah (2015) has been obtained in honor of Professor A. Mishra, Department of Statistics, Patna University, Patna (Sah, 2015). A one parameter Poisson-Mishra distribution (PMD) of B. K. Sah (2017) has been obtained by compounding Poisson distribution with Mishra distribution. It has been found that this distribution gives better fit to all the discrete data sets which are negative binomial in nature used by Sankarn (1970) and others. A generalisation of PMD has been obtained by mixing the generalised Poisson distribution of Consul and Jain (1973) with the Mishra distribution.Materials and Methods: It is based on the concept of the generalisations of some continuous mixtures of Poisson distribution.Results: Probability density function and the first four moments about origin of the proposed distribution have been obtained. The estimation of parameters of this distribution has been discussed by using the first moment about origin and the probability mass function at x = 0 . This distribution has been fitted to a number of discrete data-sets to which earlier Poisson-Lindley distribution (PLD) and PMD have been fitted.Conclusion: P-value of generalised Poisson-Mishra distribution is greater than PLD and PMD. Hence, it provides a better alternative to the PLD of Sankarn and PMD of B. K. Sah.Nepalese Journal of Statistics, Vol. 2, 27-36

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On hypergeometric generalized negative binomial distribution

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171202106193 ◽

2002 ◽

Vol 29 (12) ◽

pp. 727-736 ◽

Cited By ~ 11

Author(s):

M. E. Ghitany ◽

S. A. Al-Awadhi ◽

S. L. Kalla

Keyword(s):

Recurrence Relation ◽

Negative Binomial Distribution ◽

Binomial Distribution ◽

Field Data ◽

Goodness Of Fit ◽

Negative Binomial ◽

Generalized Negative Binomial Distribution ◽

The Right ◽

Three Term Recurrence Relation

It is shown that the hypergeometric generalized negative binomial distribution has moments of all positive orders, is overdispersed, skewed to the right, and leptokurtic. Also, a three-term recurrence relation for computing probabilities from the considered distribution is given. Application of the distribution to entomological field data is given and its goodness-of-fit is demonstrated.

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Maximum Product of Spacing Parameter Estimation of Gompertz Rayleigh Distribution and Application to Rainfall Datasets

Asian Journal of Probability and Statistics ◽

10.9734/ajpas/2021/v14i230325 ◽

2021 ◽

pp. 41-59

Author(s):

Hussein Ahmad Abdulsalam ◽

Sule Omeiza Bashiru ◽

Alhaji Modu Isa ◽

Yunusa Adavi Ojirobe

Keyword(s):

Goodness Of Fit ◽

Negative Binomial ◽

Likelihood Estimation ◽

Statistical Properties ◽

Rainfall Data ◽

Parameter Estimates ◽

Data Sets ◽

Unknown Parameters ◽

Exponentiated Weibull ◽

Integrated Hazard

Gompertz Rayleigh (GomR) distribution was introduced in an earlier study with few statistical properties derived and parameters estimated using only the most common traditional method, Maximum Likelihood Estimation (MLE). This paper aimed at deriving more statistical properties of the GomR distribution, estimating the three unknown parameters via a competitive method, Maximum Product of Spacing (MPS) and evaluating goodness of fit using rainfall data sets from Nigeria, Malaysia and Argentina. Properties of statistical distributions including distribution of smallest and largest order statistics, cumulative or integrated hazard function, odds function, rth non-central moments, moment generating function, mean, variance and entropy measures for GomR distribution were explicitly derived. The fitted data sets reveal the flexibility of GomR distribution over other distributions been compared with. Simulation study was used to evaluate the consistency, accuracy and unbiasedness of the GomR distribution parameter estimates obtained from the method of MPS. The study found that GomR distribution could not provide a better fit for Argentine rainfall data but it was the best distribution for the rainfall data sets from Nigeria and Malaysia in comparison with the distributions; Generalized Weibull Rayleigh (GWR), Exponentiated Weibull Rayleigh (EWR), Type (II) Topp Leone Generalized Inverse Rayleigh (TIITLGIR), Kumarawamy Exponential Inverse Raylrigh (KEIR), Negative Binomial Marshall-Olkin Rayleigh (NBMOR) and Exponentiated Weibull (EW). Furthermore, the estimates from MPSE were consistent as the sample size increases but not as efficient as those from MLE.

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On Methods of Estimation for Generalized Logarithmic Series Distribution and Its Application to Counts of Red Mites on Apple Leaves

Indian Journal of Pure & Applied Biosciences ◽

10.18782/2582-2845.8689 ◽

2021 ◽

Vol 9 (3) ◽

pp. 151-155

Author(s):

Fehim J Wani ◽

Keyword(s):

Maximum Likelihood ◽

Estimation Of Parameters ◽

Chi Square ◽

Estimation Techniques ◽

Apple Leaves ◽

Generalized Logarithmic Series Distribution ◽

Logarithmic Series Distribution ◽

Logarithmic Series ◽

Extra Parameter

The Generalized Logarithmic Series Distribution (GLSD) adds an extra parameter to the usual logarithmic series distribution and was introduced by Jain and Gupta (1973). This distribution has found applications in various fields. The estimation of parameters of generalized logarithmic series distribution was studied by the methods of maximum likelihood, moments, minimum chi square and weighted discrepancies. The GLSD was fitted to counts of red mites on apple leaves and it was observed that all the estimation techniques perform well in estimating the parameters of generalized logarithmic series distribution but with varying degree of non-significance.

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Modelling Migration with Poisson Regression

Technologies for Migration and Commuting Analysis ◽

10.4018/978-1-61520-755-8.ch014 ◽

2010 ◽

pp. 261-279 ◽

Cited By ~ 7

Author(s):

Robin Flowerdew

Keyword(s):

Poisson Regression ◽

Goodness Of Fit ◽

Negative Binomial ◽

Census Data ◽

Ordinary Least Squares ◽

Negative Integer ◽

Data Sets ◽

Explanatory Variables ◽

Recent Developments ◽

Generalised Linear Modelling

Most statistical analysis is based on the assumption that error is normally distributed, but many data sets are based on discrete data (the number of migrants from one place to another must be a whole number). Recent developments in statistics have often involved generalising methods so that they can be properly applied to non-normal data. For example, Nelder and Wedderburn (1972) developed the theory of generalised linear modelling, where the dependent or response variable can take a variety of different probability distributions linked in one of several possible ways to a linear predictor, based on a combination of independent or explanatory variables. Several common statistical techniques are special cases of the generalised linear models, including the usual form of regression analysis, Ordinary Least Squares regression, and binomial logit modelling. Another important special case is Poisson regression, which has a Poisson-distributed dependent variable, linked logarithmically to a linear combination of independent variables. Poisson regression may be an appropriate method when the dependent variable is constrained to be a non-negative integer, usually a count of the number of events in certain categories. It assumes that each event is independent of the others, though the probability of an event may be linked to available explanatory variables. This chapter illustrates how Poisson regression can be carried out using the Stata package, proceeding to discuss various problems and issues which may arise in the use of the method. The number of migrants from area i to area j must be a non-negative integer and is likely to vary according to zone population, distance and economic variables. The availability of high-quality migration data through the WICID facility permits detailed analysis at levels from the region to the output areas. A vast range of possible explanatory variables can also be derived from the 2001 Census data. Model results are discussed in terms of the significant explanatory variables, the overall goodness of fit and the big residuals. Comparisons are drawn with other analytic techniques such as OLS regression. The relationship to Wilson’s entropy maximising methods is described, and variants on the method are explained. These include negative binomial regression and zero-censored and zero-truncated models.

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Patterns of macroparasite aggregation in wildlife host populations

Parasitology ◽

10.1017/s0031182098003448 ◽

1998 ◽

Vol 117 (6) ◽

pp. 597-610 ◽

Cited By ~ 277

Author(s):

D. J. SHAW ◽

B. T. GRENFELL ◽

A. P. DOBSON

Keyword(s):

Poisson Distribution ◽

Negative Binomial Distribution ◽

Binomial Distribution ◽

Goodness Of Fit ◽

Negative Binomial ◽

Data Sets ◽

Frequency Distributions ◽

System A ◽

Host Sex ◽

Host Parasite

Frequency distributions from 49 published wildlife host–macroparasite systems were analysed by maximum likelihood for goodness of fit to the negative binomial distribution. In 45 of the 49 (90%) data-sets, the negative binomial distribution provided a statistically satisfactory fit. In the other 4 data-sets the negative binomial distribution still provided a better fit than the Poisson distribution, and only 1 of the data-sets fitted the Poisson distribution. The degree of aggregation was large, with 43 of the 49 data-sets having an estimated k of less than 1. From these 49 data-sets, 22 subsets of host data were available (i.e. host data could be divided by either host sex, age, where or when hosts were sampled). In 11 of these 22 subsets there was significant variation in the degree of aggregation between host subsets of the same host–parasite system. A common k estimate was always larger than that obtained with all the host data considered together. These results indicate that lumping host data can hide important variations in aggregation between hosts and can exaggerate the true degree of aggregation. Wherever possible common k estimates should be used to estimate the degree of aggregation. In addition, significant differences in the degree of aggregation between subgroups of host data, were generally associated with significant differences in both mean parasite burdens and the prevalence of infection.

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On a Generalised Exponential-Lindley Mixture of Generalised Poisson Distribution

Nepalese Journal of Statistics ◽

10.3126/njs.v4i0.33449 ◽

2020 ◽

Vol 4 ◽

pp. 33-42

Author(s):

Binod Kumar Sah ◽

A. Mishra

Keyword(s):

Poisson Distribution ◽

Negative Binomial ◽

Mixture Distribution ◽

Discrete Data ◽

P Value ◽

Data Sets ◽

Mixing Distribution ◽

Original Distribution ◽

Compound Distribution ◽

First Four Moments

Background: A mixture distribution arises when some or all parameters in a mixing distribution vary according to the nature of original distribution. A generalised exponential-Lindley distribution (GELD) was obtained by Mishra and Sah (2015). In this paper, generalized exponential- Lindley mixture of generalised Poisson distribution (GELMGPD) has been obtained by mixing generalised Poisson distribution (GPD) of Consul and Jain’s (1973) with GELD. In the proposed distribution, GELD is the original distribution and GPD is a mixing distribution. Generalised exponential- Lindley mixture of Poisson distribution (GELMPD) was obtained by Sah and Mishra (2019). It is a particular case of GELMGPD. Materials and Methods: GELMGPD is a compound distribution obtained by using the theoretical concept of some continuous mixtures of generalised Poisson distribution of Consul and Jain (1973). In this mixing process, GELD plays a role of original distribution and GPD is considered as mixing distribution. Results: Probability mass of function (pmf) and the first four moments about origin of the generalised exponential-Lindley mixture of generalised Poisson distribution have been obtained. The method of moments has been discussed to estimate parameters of the GELMGPD. This distribution has been fitted to a number of discrete data-sets which are negative binomial in nature. P-value of this distribution has been compared to the PLD of Sankaran (1970) and GELMPD of Sah and Mishra (2019) for similar type of data-sets. Conclusion: It is found that P-value of GELMGPD is greater than that in each case of PLD and GELMPD. Hence, it is expected to be a better alternative to the PLD of Sankaran and GELMPD of Sah and Mishra for similar types of discrete data-sets which are negative binomial in nature. It is also observed that GELMGPD gives much more significant result when the value of is negative.

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The Negative Binomial – Weighted Garima Distribution: Model, Properties and Applications

Pakistan Journal of Statistics and Operation Research ◽

10.18187/pjsor.v16i1.3013 ◽

2020 ◽

pp. 1-10

Author(s):

Winai Bodhisuwan ◽

Pornpop Saengthong

Keyword(s):

Parameter Estimation ◽

Count Data ◽

Negative Binomial ◽

Likelihood Estimation ◽

Real Data ◽

Distribution Model ◽

Data Sets ◽

Factorial Moments ◽

Special Cases ◽

First Four Moments

In this paper, a new mixed negative binomial (NB) distribution named as negative binomial-weighted Garima (NB-WG) distribution has been introduced for modeling count data. Two special cases of the formulation distribution including negative binomial- Garima (NB-G) and negative binomial-size biased Garima (NB-SBG) are obtained by setting the specified parameter. Some statistical properties such as the factorial moments, the first four moments, variance and skewness have also been derived. Parameter estimation is implemented using maximum likelihood estimation (MLE) and real data sets are discussed to demonstrate the usefulness and applicability of the proposed distribution.

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ESTIMATION OF PARAMETERS FOR THE LIFETIME DISTRIBUTIONS

Journal of Reliability and Statistical Studies ◽

10.13052/jrss2229-5666.1227 ◽

2019 ◽

pp. 77-92

Author(s):

Tabasam Sultana ◽

Faqir Muhammad ◽

Muhammad Aslam

Keyword(s):

Least Squares ◽

Method Of Moments ◽

Goodness Of Fit ◽

Mean Squared Error ◽

Correlation Coefficients ◽

Sample Sizes ◽

Estimation Of Parameters ◽

Lifetime Distributions ◽

Squared Error ◽

Probability Weighted Moments

This paper deals with various methods of estimation used for estimating the parameters of lifetime distributions. The distributions considered are exponential, Weibull, Rayleigh, lognormal and gamma and the method used are: method of moments, maximum likelihood, probability weighted moments, least squares and relative least squares. To compare the efficiency between the different methods of estimation, we used the total deviation, mean squared error and probability plot correlation coefficients. In order to study numerically, the execution of the different methods of estimation and goodness of fit analysis, their statistical properties have been simulated for different sample sizes. The graphs of bias designed for different methods of estimation have also been plotted against various sample sizes.

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Four statistical models for wet-spell analysis

MAUSAM ◽

10.54302/mausam.v49i4.3661 ◽

2021 ◽

Vol 49 (4) ◽

pp. 493-498

Author(s):

S. D. GORE ◽

PARVIZ NASIRI

Keyword(s):

Negative Binomial Distribution ◽

Binomial Distribution ◽

Statistical Models ◽

Negative Binomial ◽

Probability Distributions ◽

Temporal Distribution ◽

Rainfall Analysis ◽

Logarithmic Series Distribution ◽

Logarithmic Series ◽

Wet Spells

Wet-spell analysis is an important part of rainfall analysis. The distribution of the length of wet-spells provides useful information on the temporal distribution of rainfall. This distribution has traditionally been modelled through different probability distributions. Here we compare four such models, namely, Cochran's model, truncated Poisson distribution, truncated negative binomial distribution, and logarithmic series distribution. These comparisons are accomplished with help of application to five rainguage stations in India.

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