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Present and the Future of Axiomatic Theory of Boxed Pigs

Received: 23 December 2014     Accepted: 28 December 2014     Published: 23 January 2015
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Abstract

Boxed pigs or rational pigs are well-known stories with many editions of game theory. In order to promote these to a systematic and scientific theory, an axiomatic theory, called L-system of boxed pigs, is established and some special subsystems are deduced from it. In this article, we introduce the background, the main results and the future research plan of axiomatic theory of boxed pigs. This introduction is divided into the following five aspects: appearance of boxed pigs, development and actualities of boxed pigs or rational pigs, boxed pigs in China, L-system of axiomatic theory of boxed pigs, and future research------non L-systems of axiomatic theory of boxed pigs.

Published in Economics (Volume 4, Issue 3-1)

This article belongs to the Special Issue Axiomatic Theory of Boxed Pigs

DOI 10.11648/j.eco.s.2015040301.11
Page(s) 1-5
Creative Commons

This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited.

Copyright

Copyright © The Author(s), 2015. Published by Science Publishing Group

Keywords

game of boxed pigs, axiomatic theory, L-system, non-L-system

References
[1] Baldwin B.A.,Meese G.B.(1979), Social behavior in pigs studied by means of operant conditioning. Animal Behavior,27(3), 947-957.
[2] Brockmann H.J., Dawkins R., Grafen A.(1979), Evolutionarily stable nesting strategy in a digger wasp. Journal of Theoretical Biology. 77, 473-496.
[3] Dawkins R. (1976), The Selfish Gene. Oxford: Oxford University Press, 1976.
[4] Dawkins R.(1986), The Bind Watchmaker. Harlow, Longman.
[5] Jiang D.Y.(2008a), Static,completely static, and rational games of complete information and their different Nash equilibria, Int J of Innovative Computing, Information and Control, 4(3), 651-660.
[6] Jiang D.Y.(2008b), Theory of Games with Entropy and its Applications. Beijing: Science Press, (in Chinese).
[7] Jiang D.Y.(2010a), Analysis of Optimal Situation Distributions in a 2×2 Bi-matrix Game, International Journal of Innovative Computing, Information and Control, 6(7), 3229-3238.
[8] Jiang D.Y.(2010b), Marginal-able Strong Correlated Equilibria in a 3-Person 0-1 game in form(△S(0), △S(1),△S(2)), ICLSIM, 469-473.
[9] Jiang D.Y.(2010c), Situation Analysis of Double Action Games with Entropy. New York: Science Press USA Inc.
[10] Jiang D.Y.(2010d), Situation distribution on a symmetrical 3-person 0-1 game with entropy, BIFE. 233-237.
[11] Jiang D.Y.(2010e), Situation distributions in a special 3-person 0-1 game with entropy, ICIC Exprsss Letters. 4(5),1465-1469
[12] Jiang D.Y.(2011), Situation analysis method of a double action symmetrical 3-person game, Journal of Systems Engineering. 26(5), 608-613. (in Chinese)
[13] Jiang D.Y.(2012a), Most probable situations in strong Rasmusen Axiom system for boxed pigs, Systems Engineering. 30(5), 96-100. (in Chinese)
[14] Jiang D.Y.(2012b), Possibilities of situation of boxed pigs based on peace-strong cost assumption. Journal of Systems Science and Mathematical Sciences. 32 (9), 1145-1154. (in Chinese)
[15] Jiang D.Y.(2012c). Situation Analysis and Trick Theory on Games with Entropy (1st Vol, 2nd Vol.). Beijing: Science Press, 2012 (in Chinese). (in Chinese)
[16] Jiang D.Y.(2013), Axiom system for Resmusen boxed pigs and game of technology innovatios, Journal of systems Engineering. 28(2),180-186. (in Chinese)
[17] Jiang D.Y., Jiang M.Q., Hu L., and Zhu X.Y.(2013), Enthusiasm for labor about axiomatic system on boxed pigs under background of time-consuming technology developments, Operations Reserch and Management Science, 22(5):146-152.
[18] Jiang D.Y., Shao Y.B., Zhu X.Y., Matsuhisa T. (2014). Adjustment of the small pig alone abdicating in a mathematical system of rational pigs. Journal of Advanced Computing.3(2):82-97.
[19] Jiang D.Y.(2015). L-system of Boxed Pigs and its Deductive Sub-systems. Columbia: Columbia International Publishing.
[20] John McMillan.(1992), Games, Strategies, and Manager, Oxford, New York: Oxford Univ. Press.
[21] Maxwell B.Stinchcombe(2002). Notes for a Course in Game Theory (Lecture), Fall Semester.
[22] Maynard Smith J.(1982), Evolution and the Theory of Games. Camb: Camb. Univ. Press, 1982.
[23] Rasmusen E.(1989), Games and Information: An Introduction to Game Theory. New York: Wiley- Blackwell, 1st ed., 1994, 2nd ed., 2001, 3rd ed., 2006, 4th ed.
[24] Sci.and Tech. Institute of China and OR Society of China (2013), Report Advances in Operations Research. Beijing: China Science and Technology Press, pp.149-150. (in Chinese)
[25] Susan McDowell Mudambi (1996), The games retailer play, Journal of Marketing Management, 12: 695-706.
[26] Zhang W.(1996), Theory of Games and Information economics, Shanghai: Shanghai people press, (in Chinese).
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    Dianyu Jiang. (2015). Present and the Future of Axiomatic Theory of Boxed Pigs. Economics, 4(3-1), 1-5. https://doi.org/10.11648/j.eco.s.2015040301.11

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    Dianyu Jiang. Present and the Future of Axiomatic Theory of Boxed Pigs. Economics. 2015, 4(3-1), 1-5. doi: 10.11648/j.eco.s.2015040301.11

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    AMA Style

    Dianyu Jiang. Present and the Future of Axiomatic Theory of Boxed Pigs. Economics. 2015;4(3-1):1-5. doi: 10.11648/j.eco.s.2015040301.11

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  • @article{10.11648/j.eco.s.2015040301.11,
      author = {Dianyu Jiang},
      title = {Present and the Future of Axiomatic Theory of Boxed Pigs},
      journal = {Economics},
      volume = {4},
      number = {3-1},
      pages = {1-5},
      doi = {10.11648/j.eco.s.2015040301.11},
      url = {https://doi.org/10.11648/j.eco.s.2015040301.11},
      eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.eco.s.2015040301.11},
      abstract = {Boxed pigs or rational pigs are well-known stories with many editions of game theory. In order to promote these to a systematic and scientific theory, an axiomatic theory, called L-system of boxed pigs, is established and some special subsystems are deduced from it. In this article, we introduce the background, the main results and the future research plan of axiomatic theory of boxed pigs. This introduction is divided into the following five aspects: appearance of boxed pigs, development and actualities of boxed pigs or rational pigs, boxed pigs in China, L-system of axiomatic theory of boxed pigs, and future research------non L-systems of axiomatic theory of boxed pigs.},
     year = {2015}
    }
    

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    N1  - https://doi.org/10.11648/j.eco.s.2015040301.11
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    AB  - Boxed pigs or rational pigs are well-known stories with many editions of game theory. In order to promote these to a systematic and scientific theory, an axiomatic theory, called L-system of boxed pigs, is established and some special subsystems are deduced from it. In this article, we introduce the background, the main results and the future research plan of axiomatic theory of boxed pigs. This introduction is divided into the following five aspects: appearance of boxed pigs, development and actualities of boxed pigs or rational pigs, boxed pigs in China, L-system of axiomatic theory of boxed pigs, and future research------non L-systems of axiomatic theory of boxed pigs.
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Author Information
  • Institute of Game Theory with Applications, Huaihai Institute of Technology, No.59 Cangwu Road, Lianyungang, China

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