Research Article Open Access

Existence of a Total Order in Every Set

Abdelmadjid Boudaoud1
  • 1 M’sila University, Algeria

Abstract

Problem statement: The axiom of choice, guarantees that all set could be well-ordered, in particular linearly ordered. But the proof in this case was not effective, that was to say, non constructive. It was natural to ask if there was mathematics in which we could given a more constructive proof. Approach: We work in the Nelson’s IST which was an extension of ZFC (Zermelo-Fraenkel set theory with the axiom of choice). In the theory of IST there were two primitive symbols st, ∈ and the axioms of ZFC together with three axiom schemes which we call the Transfer principle (T), the principle of Idealization (I) and the principle of Standardization (S). Results: In the framework of IST we could construct, without the use of the choice axiom, a total order on every set. Conclusion: The Internal Set Theory provides a positive answer to our question.

Journal of Mathematics and Statistics
Volume 8 No. 2, 2012, 195-197

DOI: https://doi.org/10.3844/jmssp.2012.195.197

Submitted On: 7 February 2012 Published On: 16 March 2012

How to Cite: Boudaoud, A. (2012). Existence of a Total Order in Every Set. Journal of Mathematics and Statistics, 8(2), 195-197. https://doi.org/10.3844/jmssp.2012.195.197

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Keywords

  • Total order
  • axiom of choice
  • IST theory
  • axiom of standardization