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Relationship of Symmetry and Combinatorics in the Poly-Universe Game

In: Complex Symmetries

Author

Listed:
  • János Szász SAXON

    (Széchenyi Academy, Artist / Inventor, Regular member of HAS)

  • Gábor Kis

    (Engineer, physicist – National Media and Infocommunication Authority)

Abstract

We enumerate the main attributes and rules of the POLY-UNIVERSE game family from a symmetric and mathematical approach. The selected inspection method is the combinatorics since this branch of discrete mathematics is suitable for discovering the number of possibilities inherent in the product family in the most comprehensible and effective way. This essay has meaning for every enquirer who wants to contemplate knowingly the possibilities of symmetric layouts and logical correlations of the toy elements. All considerations described here are plausible, but the number of the join possibilities, explained below, is often surprising. The present essay is not intended to examine the Poly-Universe closed and from every aspect. This goal is hindered by the limits of its extension and by the high number of approaches. At the same time, we undertake to feature the fundamental correlations of the game family where we find important combinations of symmetries.

Suggested Citation

  • János Szász SAXON & Gábor Kis, 2021. "Relationship of Symmetry and Combinatorics in the Poly-Universe Game," Springer Books, in: György Darvas (ed.), Complex Symmetries, pages 163-176, Springer.
    • Handle: RePEc:spr:sprchp:978-3-030-88059-0_13
    DOI: 10.1007/978-3-030-88059-0_13
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