The Mathematics of Harmony, Hilbert’s Fourth Problem and Lobachevski’s New Geometries for Physical World ()
ABSTRACT
We suggest an original approach to Lobachevski’s geometry and Hilbert’s
Fourth Problem, based on the use of the “mathematics of harmony” and special
class of hyperbolic functions, the so-called hyperbolic Fibonacci l-functions, which are based on the ancient “golden proportion” and its generalization,
Spinadel’s “metallic proportions.” The uniqueness of these functions consists
in the fact that they are inseparably connected with the Fibonacci numbers and
their generalization― Fibonacci l-numbers (l > 0 is a given real number) and have recursive
properties. Each of these new classes of hyperbolic functions, the number of
which is theoretically infinite, generates Lobachevski’s new geometries, which
are close to Lobachevski’s classical geometry and have new geometric and
recursive properties. The “golden” hyperbolic geometry with the base
(“Bodnar’s
geometry) underlies the botanic phenomenon of phyllotaxis. The “silver”
hyperbolic geometry with the base has the least distance to Lobachevski’s
classical geometry. Lobachevski’s new geometries, which are an original
solution of Hilbert’s Fourth Problem, are new hyperbolic geometries for
physical world.
Share and Cite:
Stakhov, A. and Aranson, S. (2014) The Mathematics of Harmony, Hilbert’s Fourth Problem and Lobachevski’s New Geometries for Physical World.
Journal of Applied Mathematics and Physics,
2, 457-494. doi:
10.4236/jamp.2014.27056.