International Journal of Neutrosophic Science

Journal DOI

https://doi.org/10.54216/IJNS

Submit Your Paper

2690-6805ISSN (Online) 2692-6148ISSN (Print)

Volume 24 , Issue 3 , PP: 151-164, 2024 | Cite this article as | XML | Html | PDF | Full Length Article

Statistical Optimization of Industrial Processes for Sustainable Growth using Neutrosophic Maddala Distribution

Fuad S. Al-Duais 1 *

  • 1 Department of Business Administration, College of Sciences and the Human Sciences in Al Aflaj, Prince Sattam Bin Abdulaziz University, Al-Kharj, Saudi Arabia; Department of Business Administration Department, Administrative Science College, Thamar University, Thamar, Yemen - (F.alduais@psau.edu.sa)
  • Doi: https://doi.org/10.54216/IJNS.240313

    Received: April 29, 2024 Revised: May 15, 2024 Accepted: May 22, 2024
    Abstract

    The family of neutrosophic distributions has received considerable attention from the scientific community, due to the flexible parametric form of its probability density function, in modeling many physical phenomena with imprecise information. In this study, we consider a generalization of Singh Maddala distribution for handling fuzzy data sets. This study presents a new research endeavor: quantifying the lifespan of manufacturing enterprises using the Neutrosophic Singh Maddala Distribution (NSMD). This work significantly enhances the theoretical foundations by providing novel formulations for the moments and mode of the NSMD distribution. In addition, it expands the study beyond the traditional Maddala model by examining conventional statistical models. For estimating the unknown parameters, the maximum likelihood estimation has been used in neutrosophic framework. Characterizations are obtained in terms of neutrosophic measures. The assessment of model performance, carried out using the goodness of fit criterion, highlights the superiority of NSMD compared to other models. In the application section, a real data on carbon emission is provided for usefulness of the proposed model.

    Keywords :

    Neutrosophic probability , imprecise density , interval estimation , risk analysis , simulation

    References

    [1] S. Nadarajah and S. Kotz, Skewed distributions generated by the normal kernel, Stat Probab Lett, vol. 65, no. 3, pp. 269–277, 2003.

    [2] C. S. Kumar and L. Manju, Gamma Generalized Logistic Distribution: Properties and Applications, Journal of Statistical Theory and Applications, vol. 21, no. 3, pp. 155–174, 2022,.

    [3] B. Peng, Z. Xu, and M. Wang, The exponentiated lindley geometric distribution with applications, Entropy, vol. 21, no. 5, p.510, 2019.

    [4] V. K. Sharma, H. S. Bakouch, and K. Suthar,  An extended Maxwell distribution: Properties and applications, Communications in Statistics-Simulation and Computation, vol. 46, no. 9, pp. 6982–7007, 2017.

    [5] M. N. Shahzad and Z. Asghar, Parameter Estimation of Singh Maddala Distribution by Moments, International Journal of Advanced Statistics and Probability, vol. 1, no. 3, 121-131, 2013.

    [6] K. Kakamu, Simulation Studies Comparing Dagum and Singh–Maddala Income Distributions, Computational  Economics, vol. 48, no. 4, 593-605, 2016.

    [7] M. A. Ahmed, Extending Singh-Maddala Distribution, Journal of Modern Applied Statistical Methods, vol. 19, no. 1, pp 1-19, 2020.

    [8] D. Kumar, The Singh–Maddala distribution: properties and estimation, International Journal of System Assurance Engineering and Management, vol. 8, pp 1297-1311, 2017.

    [9] P. R. Tadikamalla, A Look at the Burr and Related Distributions, Int Statistical Review, vol. 48, no. 3, pp 337-344, 1980.

    [10]             Y. S. Güçlü, A different type of Burr distribution applying to hydro-meteorological data,” Spat Stat, vol. 43, p.100511, 2021.

    [11]             Y. He, L. Peng, D. Zhang, and Z. Zhao, Risk Analysis via Generalized Pareto Distributions, Journal of Business and Economic Statistics, vol. 40, no. 2, pp 852-867, 2022.

    [12]             Z. Khan et al., Statistical Development of the Neutrosophic Lognormal Model with Application to Environmental Data, Neutrosophic Sets and Systems, vol. 47, 2021.

    [13]             F. Smarandache, X. Zhang, and M. Ali, Algebraic Structures of Neutrosophic Triplets, Neutrosophic Duplets, or Neutrosophic Multisets, Symmetry 2019, Vol. 11, p. 171, vol. 11, no. 2, p. 171, 2019.

    [14]             F. Smarandache, Neutrosophy: neutrosophic probability, set, and logic: analytic synthesis & synthetic analysis, 1998.

    [15]             F. Smarandache, A Unifying Field in Logics : Neutrosophic Logic . Neutrosophy , Neutrosophic Set , Neutrosophic Probability ( fifth edition ), no. January 2005. 2016. doi: 10.5281/zenodo.49174.

    [16]             U. Rivieccio, Neutrosophic logics: Prospects and problems, Fuzzy Sets and Systems, vol. 159, no. 14, pp. 1860–1868, Jul. 2008.

    [17]             F. Smarandache, Introduction to Neutrosophic Statistics, Sitech & Education Publishing, Craiova, 2014, 124 p.

    [18]             Z. Khan, A. Al-Bossly, M. M. A. Almazah, and F. S. Alduais, On Statistical Development of Neutrosophic Gamma Distribution with Applications to Complex Data Analysis, Complexity, vol. 2021, pp. 1-8, 2021.

    [19]             A. M. Almarashi and M. Aslam, Process Monitoring for Gamma Distributed Product under Neutrosophic Statistics Using Resampling Scheme, Journal of Mathematics, vol. 2021, pp. 1-12, 2021.

    [20]             W. Q. Duan, Z. Khan, M. Gulistan, and A. Khurshid, Neutrosophic Exponential Distribution: Modeling and Applications for Complex Data Analysis, Complexity, vol. 2021, pp. 1-8, 2021.

    [21]             S. Broumi and F. Smarandache, Several similarity measures of neutrosophic sets, Infinite Study, vol. 410, no. 1, 2013.

    [22]             F. Smarandache et al., Introduction to neutrosophy and neutrosophic environment, Neutrosophic Set in Medical Image Analysis, pp. 3–29, 2019.

    [23]             R.R.L, Kantam, and Rao, G. Srinivasa Log-logistic distribution: modified maximum likelihood estimation. Gujarat Statistical Review, vol. 29, no.1, 25-36, 2002.

    [24]             A. M. M. Ibrahim and Z. Khan, Neutrosophic Laplace Distribution with Properties and Applications in Decision Making, International Journal of Neutrosophic Science, vol. 23, no. 1, 2024

    [25]             H. Y. A. Shihabeldeen and Z. Khan, Neutrosophic Structure of the Log-logistic Model with Applications to Medical Data, International Journal of Neutrosophic Science, vol. 23, no. 1, 2024.

    [26]              Worldometer:worldometers.info/co2-emissions/saudi-arabia-co2-emissions/{webasite}, 2024

    [27]             Z. Khan, M. Gulistan, R. Hashim, N. Yaqoob, and W. Chammam, “Design of S-control chart for neutrosophic data: An application to manufacturing industry,” Journal of Intelligent & Fuzzy Systems, vol. 38, no. 4, pp. 4743–4751, 2020.

     

     

    Cite This Article As :
    S., Fuad. Statistical Optimization of Industrial Processes for Sustainable Growth using Neutrosophic Maddala Distribution. International Journal of Neutrosophic Science, vol. , no. , 2024, pp. 151-164. DOI: https://doi.org/10.54216/IJNS.240313
    S., F. (2024). Statistical Optimization of Industrial Processes for Sustainable Growth using Neutrosophic Maddala Distribution. International Journal of Neutrosophic Science, (), 151-164. DOI: https://doi.org/10.54216/IJNS.240313
    S., Fuad. Statistical Optimization of Industrial Processes for Sustainable Growth using Neutrosophic Maddala Distribution. International Journal of Neutrosophic Science , no. (2024): 151-164. DOI: https://doi.org/10.54216/IJNS.240313
    S., F. (2024) . Statistical Optimization of Industrial Processes for Sustainable Growth using Neutrosophic Maddala Distribution. International Journal of Neutrosophic Science , () , 151-164 . DOI: https://doi.org/10.54216/IJNS.240313
    S. F. [2024]. Statistical Optimization of Industrial Processes for Sustainable Growth using Neutrosophic Maddala Distribution. International Journal of Neutrosophic Science. (): 151-164. DOI: https://doi.org/10.54216/IJNS.240313
    S., F. "Statistical Optimization of Industrial Processes for Sustainable Growth using Neutrosophic Maddala Distribution," International Journal of Neutrosophic Science, vol. , no. , pp. 151-164, 2024. DOI: https://doi.org/10.54216/IJNS.240313