A Novel Flexible Logarithmic Cosine-G Family of Distributions with Applications to Event Time Data

Authors

  • Dr. Zubir Shah Department of Statistics, Abdul Wali Khan University, Mardan, KP, 23200, Pakistan Author https://orcid.org/0000-0002-9174-9978
  • Zubair Ahmad Department of Statistics, Yazd University, Yazd 8915818411, Iran Author
  • Dr. Zahra Almaspoor Department of Statistics, Yazd University, Yazd 8915818411, Iran Author
  • Dr. Faridoon Khan Department of Creative Technologies, FCAI, Air University, Islamabad, Pakistan Author
  • Dr. Chrisogonus K. Onyekwere Nnamdi Azikiwe University, Awka, Nigeria Author
  • Dr. Gadde Srinivasa Rao Department of Mathematics and Statistics‎, ‎University of Dodoma‎, ‎Dodoma P.O‎. ‎Box 259‎, ‎Tanzania Author
  • Dr. Saima K‎. ‎Khosa Department of Mathematics and Statistics‎, ‎University of Saskatchewan‎, ‎Saskatoon‎, ‎SK S7N 5A2‎, ‎Canada Author

DOI:

https://doi.org/10.64389/mjs.2026.02283

Keywords:

Logarithmic Cosine-G , Estimation, Statistical properties , Simulation study, Biomedical data modeling

Abstract

Many probability distributions have been developed in the literature on distribution theory to describe and forecast real-world phenomena, especially in the domains of engineering, sports, and medicine. To give the current distribution greater flexibility, these distributions are generated with the addition of one or more extra parameters. Reparameterization and estimation issues are the two major issues that arise when additional parameters are added to the existing distribution. We make a significant attempt to propose a novel statistical methodological strategy for generating more flexible distributions devoid of extra parameters to prevent the aforementioned two issues. The logarithmic and cosine functions are used to build the recently described approach. A Novel Flexible Logarithmic Cosine-G (NFLC-G) family of distributions is the name given to the newly suggested approach. Additionally, some distributional characteristics of the NFLC-G family are also obtained. Using the newly suggested approach, a unique sub-model known as the Novel Flexible Logarithmic Cosine Weibull (NFLC-Wei) distribution is established. The Maximum Likelihood estimation method is used to estimate the model parameters of the proposed family of distributions. Similarly, a comprehensive Monte Carlo simulation analysis verifies the accuracy of the parameter estimation technique. From simulation analysis, it is observed that as the sample size increases, the biases and mean square errors declined as well as MLEs gradually approach the true parameter values. Moreover, three sets of biomedical data are demonstrated to check the applicability of the NFLC-G family of distributions. Using statistical information criteria, the performance of the proposed distribution is compared to other well-known existing distributions. Finally, we found that the NFLC-Wei distribution appears to be the best option for the studied data sets based on these statistical information requirements.



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Published

2026-06-04

Data Availability Statement

 

The data supporting this study's findings are available within the article.

Issue

Section

Articles

How to Cite

Shah, Z., Ahmad, Z., Almaspoor, Z. ., Khan, F. ., Onyekwere, C. K. ., Rao, G. S. ., & ‎Khosa, S. K. . (2026). A Novel Flexible Logarithmic Cosine-G Family of Distributions with Applications to Event Time Data. Modern Journal of Statistics, 2(2), 81-102. https://doi.org/10.64389/mjs.2026.02283