Stakhov, Alexey and Aranson, Samuil
(2011)
*Hyperbolic Fibonacci and Lucas Functions, “Golden” Fibonacci Goniometry, Bodnar’s Geometry, and Hilbert’s Fourth Problem—Part II. A New Geometric Theory of Phyllotaxis (Bodnar’s Geometry).*
Applied Mathematics, 02 (02).
pp. 181-188.
ISSN 2152-7385

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## Abstract

This article refers to the “Mathematics of Harmony” by Alexey Stakhov in 2009, a new interdisciplinary direction of modern science. The main goal of the article is to describe two modern scientific discoveries–New Geometric Theory of Phyllotaxis (Bodnar’s Geometry) and Hilbert’s Fourth Problem based on the Hyperbolic Fibonacci and Lucas Functions and “Golden” Fibonacci λ-Goniometry (λ > 0 is a given positive real number). Although these discoveries refer to different areas of science (mathematics and theoretical botany), however they are based on one and the same scientific ideas-the “golden mean,” which had been introduced by Euclid in his Elements, and its generalization—the “metallic means,” which have been studied recently by Argentinian mathematician Vera Spinadel. The article is a confirmation of interdisciplinary character of the “Mathematics of Harmony”, which originates from Euclid’s Elements.

Item Type: | Article |
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Subjects: | Opene Prints > Mathematical Science |

Depositing User: | Managing Editor |

Date Deposited: | 06 Jun 2023 06:10 |

Last Modified: | 21 Nov 2023 05:31 |

URI: | http://geographical.go2journals.com/id/eprint/2086 |