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Issue:Some remarks on the potentials of the generalized nets as an effective and efficient tool for solving a multitude of practical management and economic problems

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Title of paper: Some Remarks on the Potentials of the Generalized Nets as an Effective and Efficient Tool for Solving a Multitude of Practical Management and Economic Problems
Author(s):
Aleksander Kacprzyk
Resource Partners, Zebra Tower, ul. Mokotowska 1, 00–640 Warsaw, Poland
aleksander.kacprzyk@resourcepartners.eu
Published in: "Issues in Intuitionistic Fuzzy Sets and Generalized Nets", Volume 14 (2018/19), pages 92-112
Download:  PDF (201  Kb, File info)
Abstract: The paper represents an overview of the possibilities for solving of practical management and economic problems with the help of Generalized Nets (GNs). The advantages of the GNs approach to the modeling of discrete event systems are summarized. GNs make it possible to formalize, analyze and algorithmize many more types of behavior and properties of the discrete-event systems than even the sophisticated extensions of the Petri nets. In particular, an outline for structuring, codification, and a possible implementation of the executive compensation design process is presented which is the base for construction of GN model.
Keywords: Executive compensation design, Generalized nets, Petri nets.
References:
  1. Angelova, N., D. Zoteva, Implementation of the reducing operators over generalized nets in GN IDE.Issues in Intuitionistic Fuzzy Sets and Generalized Nets, Vol. 12, 2015/2016, 8092.
  2. Andonov, V., Intuitionistic fuzzy generalized nets with characteristics of the places of Types 1 and 3. Notes on Intuitionistic Fuzzy Sets, Vol. 19, 2013, No 3, 99–110.
  3. Andonov, V., Reduced generalized nets with characteristics of the places. International Journal “Information Models and Analyses”, Vol. 3, No 2, 2014, 113–125.
  4. Andonov V., Generalized nets with characteristics of the arcs. Compt. rend. Acad. bulg. Sci., Vol. 70, 2017, No 10, 1341–1346.
  5. Andonov, V., K. Atanassov, Generalized nets with characteristics of the places. Compt. rend. Acad. bulg. Sci., Vol. 66, 2013, No 12, 1673–1680.
  6. Atanassov K., Generalized nets and their fuzzings, AMSE Review, Vol. 2 (1985), No. 3, 39-49.
  7. Atanassov, K., Generalized Nets. World Scientific, Singapore, London, 1991.
  8. Atanassov, K., Introduction in the Theory of the Generalized Nets. Bourgas, Pontica Print, 1992 (in Bulgarian).
  9. Atanassov, K.T, Generalized Nets and Systems Theory. ”Prof. Marin Drinov” Academic Publishing House, Sofia, 1997.
  10. Atanassov, K.T, Intuitionistic Fuzzy Sets: Theory and Applications. Springer-Verlag, Heidelberg, 1999.
  11. Atanassov, K.T., On Generalized Nets Theory. “Prof. Marin Drinov” Academic Publishing House, Sofia, 2007.
  12. Atanassov, K.T, On Intuitionistic Fuzzy Sets Theory. Springer, Berlin, Heidelberg, 2012.
  13. Atanassov, K.T., Index Matrices: Towards an Augmented Matrix Calculus. Springer, Heidelberg and New York, 2015.
  14. Atanassov, K.T., Intuitionistic Fuzzy Logics. Springer, Cham, 2017.
  15. Atanassov, K.T., A. Kacprzyk, V. Skenderov, A. Kryuchukov, Principles of a generalized net model of the activity of a petrochemical combine. Proceedings of the Eighth International Workshop on Generalized Nets, Sofia, Bulgaria, 2007, 38–41.
  16. Atanassov, K.T., A. Kacprzyk, E. Sotirova, A Novel Generalized Net Model of the Executive Compensation Design. Journal of Automation, Mobile Robotics & Intelligent Systems, Vol. 8, No. 3, 2014, 64–74.
  17. Cassandras, C, S. Lafortune, Introduction to Discrete Event Systems. Springer, heidelberg and New York, 2007.
  18. Haas, P., Stochastic Petri nets: Modeling, stability, simulation. Springer-Verlag.
  19. He, X., Temporal predicate transition nets – A new formalism for specifying and verifying concurrent systems. International Journal of Computer Mathematics, 45 (1/2), 1992, 171–184.
  20. Jensen, K., Coloured Petri Nets: Basic Concepts. Springer, 2010.
  21. Jensen, K., L.M. Kristensen, Coloured Petri Nets: Modelling and Validation of Concurrent Systems. Springer, 2009.
  22. Jensen, K., Rozenberg G. (Eds.), High-level Petri Nets – Theory and Applications. Springer, 1991.
  23. Kacprzyk, A., I. Mihailov, Intuitionistic fuzzy estimation of the liquidity of the banks: A generalized net model. Proceedings of the 13th International Workshop on Generalized Nets, London, UK,2012, 34–42.
  24. Kacprzyk, A., E. Sotirova, K.T. Atanassov, Modelling the executive compensation design model using a generalized net. Proceedings of the 14th International Workshop on Generalized Nets, Bourgas, Bulgaria, 2013, 71–77.
  25. Kumar, R., V.K. Garg, Modeling and Control of Logical Discrete Event Systems, Springer, Heidelberg and New York, 1995.
  26. Mihailov, I., Generalized Net Model for Describing Some Banking Activities. Proceedings of the, New Developments in Fuzzy Sets, Intuitionistic Fuzzy Sets, Generalized Nets and Related Topics, Vol II: Applications, Warsaw, Poland, 2013, 115–122.
  27. Murata, T., Petri Nets: Properties, Analysis and Applications. Proceedings of the IEEE, 77(4), 1989, 541–680.
  28. Peterson, J.L., Petri Netsand the Modeling of Systems. Prentice–Hall, 1981.
  29. Petri, K. A., Kommunikation mit Automaten. Dissertation, Schriften des IIM 2, Rheinisch–Westfaälisches Institute für Mathematik an der Universität Bonn, 1962.
  30. Popova–Zeugmann, L., Time and Petri Nets. Springer, 2013.
  31. Reisig, W., Petri Nets: An Introduction. Springer, 1985.
  32. Reisig, W., Understanding Petri Nets: Modelling Techniques, Analysis Methods, Case Studies. Springer, 2013.
  33. Starke, P., Petri-Netze. Berlin, VEB Deutscher Verlag der Wissenschaften, Berlin, 1980.
  34. Zoteva, D., Implementation of Hierarchical Operators in GN IDE. Uncertainty and Imprecision in Decision Making and Decision Support: Cross fertilization, New Models and Applications (K.T. Atanassov, J. Kacprzyk, et al., Eds.), Springer, Cham, 2019 (in press).
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