Warianty tytułu
Języki publikacji
Abstrakty
A golden ratio has been applied since ancient times in many areas, starting with architecture and art, and nowadays in modern financial markets and contemporary physics. This paper defines a golden rule in a set of preferences, generalizing the problem of group choice and the 2/3 rule of Łyko by means of a golden number corresponding to the ratio of lengths of sides in a golden rectangle.(original abstract)
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Twórcy
autor
- Wrocław University of Economics, Poland
autor
- Wrocław University of Economics, Poland
Bibliografia
- Boroden C. (2008). Fibonacci Trading: How to Master the Time and Price Advantage. McGraw-Hill. New York.
- Carracedo L.M., Kaiser M., Kramer M.A. et al. (2008). Temporal interactions between cortical rhythms. Frontiers in Neuroscience 2(2), pp. 145-154.
- Coldea R., Tennant D.A., Wheeler E.M. et al. (2010). Quantum Criticality in an Ising Chain: Experimental Evidence for Emergent E8 Symmetry. Science 327(5962), pp. 177-180.
- Łyko J. (2000). Twierdzenia Arrowa a ordynacje. [In:] Smoluk A. (ed.). Elementy metrologii ekonomicznej. Wydawnictwo AE we Wrocławiu, pp. 165-168.
- Łyko J., Misztal A., Smoluk A. (2000). Problem of group choice and the 2/3 rule. Ekonomia Matematyczna 4. Wydawnictwo AE we Wrocławiu, pp. 21-34.
- Omotehinwa T.O., Ramon S.O. (2013). Fibonacci numbers and golden ratio in mathematics and science. International Journal of Computer and Information Technology 2(4), pp. 630-638.
- Sigalotti L.D.G., Mejias A. (2006). The golden ratio in special relativity. Chaos, Solitons and Fractals 30(3), pp. 521-524.
- Weiss V., Weiss H. (2003). The golden mean as clock cycle of brain waves. Chaos, Solitons and Fractals 18(4), pp. 643-652.
Typ dokumentu
Bibliografia
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Identyfikator YADDA
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