Abstract

Johannes Kepler made his great breakthrough when he discovered the elliptical path of the planet Mars around the Sun located in one focus of that ellipse (on the 11th October in 1605 in a letter to Fabricius). The first generation of researchers in the 17th century intensively discussed about the possible mechanism needed for the generation of that elliptical orbit and about the function of the empty focus of that ellipse. First generations of researchers proposed an interplay between attractive and repulsive forces that might guide the planet on its elliptical orbit. Isaac Newton made a giant mathematical progress in his Principia and introduced the concept of the attractive gravitational force between the Sun and planets. However, Newton did not propose a possible mechanism behind this attractive force. Albert Einstein in 1915 left the concept of attractive and repulsive forces and introduced his Theory based on the elastic spacetime. In his concept gravity itself became fictitious force and the attraction is explained via the elastic spacetime. In our proposed model we try to re-open the discussion of Old Masters on the existence of attractive and repulsive forces. The guiding principle for our trigonometrical model is the generation of the ellipse discovered by one of the last ancient Greek mathematicians – Anthemius of Tralles – who generated the ellipse by the so-called gardener’s method (one string and two pins fixed to the foci of that ellipse). Frans van Schooten in 1657 invented a series of original simple mechanisms for generating ellipses, hyperbolas, and parabolas. Schooten’s antiparallelogram might simulate the interplay of attractive and repulsive forces creating the elliptical path. We propose a model with trigonometrically organized Solar and planet gravitons. In this model the Solar and planet gravitons are reflected and refracted in predetermined directions so that their joint momentum transferred on the planet atoms guides the planet on an elliptical path around the Sun. At this stage we cannot directly measure the gravitons but we can use the analogy with behavior of photons. We propose to observe paths of photons emitted from one focus of the ellipse towards the QUARTER-silvered elliptical mirror. 1/4 of photons will be reflected towards to the second empty focus and the ¾ of photons might be reflected and refracted into the trigonometrically expected directions. (Until now we have experimental data only for the FULLY–silvered elliptical mirrors). The observed behavior of photons with the quarter-silvered elliptic mirror might support this concept or to exclude this model as a wrong model. The quantitative values of attractive and repulsive forces could be found from the well-known geometrical properties of the ellipse. The characteristic lengths of distances will be inserted into the great formula of Isaac Newton - the inverse square law. (In order to explain some orbit anomalies, we can use Paul Gerber’s formula derived for the Pierre Fermat principle). We have found that the Kant’s ellipse rotating on the Keppler’s ellipse might express the co-operation of attractive and repulsive forces to guide the planet on its elliptic path. Finally, we have derived a new formula inspired by Bradwardine - Newton - Tan - Milgrom that might contribute to the MOND gravitational model. We have found that the Kepler ellipse is the very elegant curve that might still keep some hidden secrets waiting for our future research.

Highlights

  • The famous quote of Heraclitus “Nature loves to hide” was described in details by Pierre Hadot in 2008

  • The emperor Rudolph II. invited to Prague Tycho Brahe and Tadeáš Hájek z Hájku organized the invitation for Johannes Kepler in order to join the research group of Tycho Brahe on the 3rd February 1600

  • Kepler was thinking for many years about two topics hidden in those elliptical paths: 1) what is the geometrical mechanism that guides the planet on the elliptical orbit? 2) what is the function of the empty focus? Kepler had assumed that that the elliptical orbit of the planets could be explained by the effect of two joined forces: an “anima force” emanating from the Sun and “vis insita” inherent in the planet itself

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Summary

Introduction

The famous quote of Heraclitus “Nature loves to hide” was described in details by Pierre Hadot in 2008. Kepler had assumed that that the elliptical orbit of the planets could be explained by the effect of two joined forces: an “anima force” emanating from the Sun and “vis insita” inherent in the planet itself. Kepler was thinking for many years about two topics hidden in those elliptical paths: 1) what is the geometrical mechanism that guides the planet on the elliptical orbit? These two open topics passed into hands of other giants in the 17th century: Galileo, René Descartes, Christian Huygens, Gottfried Leibniz, Robert Hook and Isaac Newton. (We are aware of the famous quote of Richard Feynman from the year 1962: “There’s certain irrationality to any work in gravitation, so it is hard to explain why you do any of it.”)

Some Trigonometric Properties of the Ellipse
Reflecting Properties of Photons on the Fully-Silvered Elliptic Mirror
Findings
Conclusions

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