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The Concept of General Systems

  • Jeffrey Yi-Lin ForrestEmail author
Chapter
Part of the IFSR International Series in Systems Science and Systems Engineering book series (IFSR, volume 32)

Abstract

This chapter focuses on the basic concept of general systems and then the fundamental properties of general systems. In particular, Section 2.1 introduces the concept of general systems that will be used throughout the rest of this book along with a brief review of other relevant concepts studied by various scholars in different contexts. Section 2.2 investigates the internal properties of general systems. Section 2.3 considers the set-theoretical structures of general systems and L-fuzzy systems along with the existence of centralized systems.

References

  1. Berlinski, D.: On Systems Analysis. MIT Press, Cambridge, MA (1976)Google Scholar
  2. Blauberg, I.V., Sadovsky, V.N., Yudin, E.G.: Systems Theory, Philosophical and Methodological Problems. Progress Publishers, Moscow (1977)Google Scholar
  3. Bunge, B.: Treatise on Basic Philosophy, vol. 4. A World of Systems. Reidel, Dordrecht, Holland (1979)Google Scholar
  4. Engelking, R.: General Topology. Polish Scientific Publishers, Warszawa (1975)zbMATHGoogle Scholar
  5. Gratzer, G.: Universal Algebra. Springer, New York (1978)zbMATHGoogle Scholar
  6. Hall, A.D., Fagen, R.E.: Definitions of systems. Gen. Syst. 1, 18–28 (1956)Google Scholar
  7. Kline, M.: Mathematical Thought from Ancient to Modern Times. Oxford University Press, Oxford (1972)zbMATHGoogle Scholar
  8. Klir, G.: Architecture of Systems Problem Solving. Plenum Press, New York (1985)CrossRefGoogle Scholar
  9. Kuhn, T.: The Structure of Scientific Revolutions. University of Chicago Press, Chicago (1962)Google Scholar
  10. Lilienfeld, D.: The Rise of Systems Theory. Wiley, New York (1978)Google Scholar
  11. Lin, Y.: A model of general systems. Math. Modell. Int. J. 9(2), 95–104 (1987)MathSciNetCrossRefGoogle Scholar
  12. Lin, Y., Ma, Y.: Remarks on the Definition of Systems. Syst. Anal. Model Simu. 6(11), 923–931 (1989)Google Scholar
  13. Lin, Y.: A multi-relation approach of general systems and tests of applications. Syn. Int. J. Epistem. Methodol. Phil. Sci. 79, 473–488 (1989a)Google Scholar
  14. Lin, Y.: The concept of fuzzy systems. Kybernetes: Int. J. Systems. Cybernet. 19, 45–51 (1990)MathSciNetCrossRefGoogle Scholar
  15. Lin, Y.: General Systems Theory: A Mathematical Approach. Kluwer Academic and Plenum Publishers, New York (1999)zbMATHGoogle Scholar
  16. Lin, Y., Ma, Y.H.: Remarks on analogy between systems. Int. J. Gen. Syst. 13, 135–141 (1987a)MathSciNetCrossRefGoogle Scholar
  17. Lin, Y., Ma, Y.H.: On the stabilities of input-output systems. Cybern. Syst. Int. J. 18(4), 285–298 (1987b)MathSciNetCrossRefGoogle Scholar
  18. Mesarovic, M.D.: Views on general systems theory. In: Mesarovic, M.D. (ed.) Proceedings of the 2nd Systems Symposium at Case Institute of Technology. Wiley, New York (1964)Google Scholar
  19. Mesarovic, M.D., Takahara, Y.: General Systems Theory: Mathematical Foundations. Academic Press, New York (1975)zbMATHGoogle Scholar
  20. Perlman, J.S.: The Atom and the Universe. Wadsworth, Belmont, CA (1970)Google Scholar
  21. Tarski, A.: Contributions to the theory of models I, II, III. Nederl. Akad. Wetensch. Proc. Ser. A. 57, 572–581, 582–588; 58, 56–64 (1954, 1955)Google Scholar
  22. von Bertalanffy, L.: Modern Theories of Development (Woodge, J.H., Trans.). Oxford University Press, Oxford (1934); Harper Torch Books, New York (1962); German Original: Kritische Theories der Formbildung, Borntäger, Berlin (1928)Google Scholar
  23. von Bertalanffy, L.: The history and status of general systems theory. In: Klir, G. (ed.) Trends in General Systems Theory. New York, pp. 21–41 (1972)Google Scholar
  24. Wigner, E.P.: The unreasonable effectiveness of mathematics in the natural sciences. Comm. Pure Appl. Math. 13, 1–14 (1960)CrossRefGoogle Scholar
  25. Wu, X.-M.: The Pansystems View of the World. People’s University of China Press, Beijing (1990)Google Scholar
  26. Zadeh, L.: Fuzzy sets. Inf. Control 8(3), 338–353 (1965)CrossRefGoogle Scholar

Copyright information

© Springer Nature Switzerland AG 2018

Authors and Affiliations

  1. 1.School of BusinessSlippery Rock University School of BusinessSlippery RockUSA

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