We introduce the notion of base changeable sets and study the principal properties of these sets. Base changeable sets are required for the construction of the general theory of changeable sets. The problem studied in our paper is closely connected with the famous sixth Hilbert problem.
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References
P. S. Aleksandrov (editor), Hilbert Problems, Nauka, Moscow (1969).
A. D. Gladun, “Sixth Hilbert problem,” Potential, No. 3 (2006); http://potential.org.ru/Home/ProblemGilbert.
Yu. I. Petunin and D. A. Klyushin, “A structural approach to solving the 6 th Hilbert problem,” Theory Probab. Math. Statist., No. 71, 165–179 (2005).
J. C. C. McKinsey, A. C. Sugar, and P. Suppes, “Axiomatic foundations of classical particle mechanics,” J. Ration. Mech. Anal., No. 2, 253–272 (1953).
J. W. Schutz, Foundations of Special Relativity: Kinematic Axioms for Minkowski Space-Time, Springer, Berlin (1973).
N. C. A. da Costa and F. A. Doria, “Suppes predicates for classical physics,” in: Proc. of the Internat. Symp. on the Structures in Mathematical Theories (San Sebastian, Spain, 1990), De-Gruyter, Berlin (1992), pp. 168–191.
S. Sant’Anna Adonai, “The definability of physical concepts,” Bol. Soc. Parana. Mat. (3s.), 23, No. 1-2, 163–175 (2005).
R. I. Pimenov, “Mathematical temporal structures,” in: Structures of Time in Natural Sciences: On the Way of Understanding of the Phenomenon of Time [in Russian], Part 1, Moscow University, Moscow (1996), pp. 153–199.
R. I. Pimenov, Foundations of the Theory of Temporal Universe [in Russian], Lenand, Moscow (2006).
A. P. Levich, Methodological Difficulties on the Way of Understanding of the Phenomenon of Time [in Russian] (2009); http://www.chronos.msu.ru/RREPORTS/levich trudnosti.pdf.
A. P. Levich, “Why advances in the study of time are insignificant,” in: A. P. Levich (editor), On the Way of Understanding of the Phenomenon of Time: Structures of Time in Natural Science [in Russian], Part 3, Progress-Traditsiya, Moscow (1999), pp. 15–29.
O. Bilanyuk, Tachyons. Selected Works to the 40th Anniversary of the Hypothesis of Tachyon [in Ukrainian], Evrosvit, Lviv (2002).
J. M. Hill and B. J. Cox, “Einstein’s special relativity beyond the speed of light,” Proc. Roy. Soc. London, Publ. ahead of print October 3, 2012.
G. Birkhoff, Lattice Theory [Russian translation], Nauka, Moscow (1984).
V. S. Anishchenko and T. E. Vadivasova, Lectures on Nonlinear Mechanics [in Russian], Research Center, “Regular and Chaotic Mechanics,” Izhevsk (2011).
Ya. I. Hrushka, “Changeable sets and their properties,” Dop. Nats. Akad. Nauk Ukr., No. 5, 12–18 (2012).
Ya. I. Hrushka, “Primitive changeable sets and their properties,” Mat. Visn. Nauk. Tov. Shevchenko, 9, 52–80 (2012).
Ya. I. Grushka, Abstract Concept of Changeable Set, Preprint arXiv:1207.3751 (2012); http://arxiv.org/abs/1207.3751.
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Translated from Ukrains’kyi Matematychnyi Zhurnal, Vol. 65, No. 9, pp. 1198–1218, September, 2013.
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Hrushka, Y.I. Base Changeable Sets and Mathematical Simulation of the Evolution of Systems. Ukr Math J 65, 1332–1353 (2014). https://doi.org/10.1007/s11253-014-0862-6
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DOI: https://doi.org/10.1007/s11253-014-0862-6