A New Generalized Logarithmic–X Family of Distributions with Biomedical Data Analysis

In this article, an attempt is made to propose a novel method of lifetime distributions with maximum flexibility using a popular T–X approach together with an exponential distribution, which is known as the New Generalized Logarithmic-X Family (NGLog–X for short) of distributions. Additionally, the generalized form of the Weibull distribution was derived by using the NGLog–X family, known as the New Generalized Logarithmic Weibull (NGLog–Weib) distribution. For the proposed method, some statistical properties, including the moments, moment generating function (MGF), residual and reverse residual life, identifiability, order statistics, and quantile functions, were derived. The estimation of the model parameters was derived by using the well-known method of maximum likelihood estimation (MLE). A comprehensive Monte Carlo simulation study (MCSS) was carried out to evaluate the performance of these estimators by computing the biases and mean square errors. Finally, the NGLog–Weib distribution was implemented on four real biomedical datasets and compared with some other distributions, such as the Alpha Power Transformed Weibull distribution, Marshal Olkin Weibull distribution, New Exponent Power Weibull distribution, Flexible Reduced Logarithmic Weibull distribution, and Kumaraswamy Weibull distribution. The analysis results demonstrate that the new proposed model performs as a better fit than the other competitive distributions.

[1]  Ancha Xu,et al.  A prognostic driven predictive maintenance framework based on Bayesian deep learning , 2023, Reliab. Eng. Syst. Saf..

[2]  Dost Muhammad Khan,et al.  A New Modified Exponent Power Alpha Family of Distributions with Applications in Reliability Engineering , 2022, Processes.

[3]  Ancha Xu,et al.  Bayesian Inference of System Reliability for Multicomponent Stress-Strength Model under Marshall-Olkin Weibull Distribution , 2022, Syst..

[4]  Fathy H. Riad,et al.  A New Flexible Logarithmic-X Family of Distributions with Applications to Biological Systems , 2022, Complex..

[5]  Dost Muhammad Khan,et al.  A New Member of T-X Family with Applications in Different Sectors , 2022, Journal of Mathematics.

[6]  Fathy H. Riad,et al.  A novel logarithmic approach to generate new probability distributions for data modeling in the engineering sector , 2022, Alexandria Engineering Journal.

[7]  Muhammad S. Rashid,et al.  The Generalized Alpha Exponent Power Family of Distributions: Properties and Applications , 2022, Mathematics.

[8]  Gichuhi. A. Waititu,et al.  A new generalization of Gull Alpha Power Family of distributions with application to modeling COVID-19 mortality rates , 2022, Results in Physics.

[9]  Hadeel S. Klakattawi,et al.  A new generalized family of distributions based on combining Marshal-Olkin transformation with T-X family , 2022, PloS one.

[10]  Lijuan Shen,et al.  Modelling and estimation of system reliability under dynamic operating environments and lifetime ordering constraints , 2021, Reliab. Eng. Syst. Saf..

[11]  Olayemi Joshua Ibidoja,et al.  The shifted exponential-G family of distributions : Properties and applications , 2021, Journal of Statistics and Management Systems.

[12]  Yincai Tang,et al.  A Unified Model for System Reliability Evaluation Under Dynamic Operating Conditions , 2021, IEEE Transactions on Reliability.

[13]  E. H. Hafez,et al.  A New Inverted Topp-Leone Distribution: Applications to the COVID-19 Mortality Rate in Two Different Countries , 2021, Axioms.

[14]  J. T. Eghwerido,et al.  The transmuted alpha power-G family of distributions , 2020 .

[15]  Saima K. Khosa,et al.  Type-I heavy tailed family with applications in medicine, engineering and insurance , 2020, PloS one.

[16]  Muhammad Aamir,et al.  A New Lifetime Exponential-X Family of Distributions with Applications to Reliability Data , 2020 .

[17]  F. Famoye,et al.  Truncated Family of Distributions with Applications to Time and Cost to Start a Business , 2020, Methodology and Computing in Applied Probability.

[18]  Muhammad Ilyas,et al.  A New Extended-X Family of Distributions: Properties and Applications , 2020, Comput. Math. Methods Medicine.

[19]  G. Hamedani,et al.  A New Flexible Bathtub-Shaped Modification of the Weibull Model: Properties and Applications , 2020 .

[20]  Saima K. Khosa,et al.  Modeling Vehicle Insurance Loss Data Using a New Member of T-X Family of Distributions , 2020 .

[21]  Saima K. Khosa,et al.  A Flexible Reduced Logarithmic-X Family of Distributions with Biomedical Analysis , 2020, Comput. Math. Methods Medicine.

[22]  G. G. Hamedani,et al.  The Fréchet Topp Leone-G Family of Distributions: Properties, Characterizations and Applications , 2019, Annals of Data Science.

[23]  G. Özel,et al.  Alpha Power Inverted Exponential Distribution: Properties and Application , 2018 .

[24]  M. Mesfioui,et al.  A New Extension of Weibull Distribution with Application to Lifetime Data , 2017 .

[25]  M. H. Tahir,et al.  The logistic-X family of distributions and its applications , 2016 .

[26]  Ayman Alzaatreh,et al.  A new method for generating families of continuous distributions , 2013 .

[27]  Saad J. Almalki,et al.  A new modified Weibull distribution , 2013, Reliab. Eng. Syst. Saf..

[28]  N. Balakrishnan,et al.  The gamma-exponentiated exponential distribution , 2012 .

[29]  Saralees Nadarajah,et al.  The Kumaraswamy Weibull distribution with application to failure data , 2010, J. Frankl. Inst..

[30]  Narayanaswamy Balakrishnan,et al.  On families of beta- and generalized gamma-generated distributions and associated inference , 2009 .

[31]  M. Formigoni,et al.  Drug use by Brazilian students: associations with family, psychosocial, health, demographic and behavioral characteristics. , 2004, Addiction.

[32]  F. Famoye,et al.  BETA-NORMAL DISTRIBUTION AND ITS APPLICATIONS , 2002 .

[33]  I. Olkin,et al.  A new method for adding a parameter to a family of distributions with application to the exponential and Weibull families , 1997 .

[34]  T. Bjerkedal Acquisition of resistance in guinea pigs infected with different doses of virulent tubercle bacilli. , 1960, American journal of hygiene.

[35]  Eisa Mahmoudi,et al.  The Arcsine-X Family of Distributions with Applications to Financial Sciences , 2021, Comput. Syst. Sci. Eng..

[36]  W. Yanping,et al.  A New Logarithmic Family of Distributions: Properties and Applications , 2020, Computers, Materials & Continua.

[37]  Zhi-Sheng Ye,et al.  Estimation of Field Reliability Based on Aggregate Lifetime Data , 2017, Technometrics.

[38]  Hamzeh Torabi,et al.  The gamma-uniform distribution and its applications , 2012, Kybernetika.