Harmony of the Froissart Theorem in Fundamental Dynamics of Particles and Nuclei

TL;DR

This paper explores the mathematical and physical significance of the Froissart theorem, linking it to Pythagorean ideas and suggesting a harmonious underlying structure in particle and nuclear physics.

Contribution

It establishes a novel connection between the Froissart theorem and Pythagorean mathematical and philosophical concepts, highlighting a harmonious structure in fundamental dynamics.

Findings

Link between Froissart theorem and Pythagorean ideas

Mathematical and geometrical analysis of the theorem

Implication of harmony in particle and nuclear physics

Abstract

It has been shown that the great ancient Pythagorean ideas have found themselves in the latest researches in high energy elementary particles and nuclear physics. In this respect we concern and discuss the mathematical, physical and geometrical aspects of the famous Froissart theorem and in this way one establishes a link of this theorem to the mathematics and ideas elaborated in the Pythagorean school. A harmony of the Froissart theorem in fundamental dynamics of particles and nuclei has been displayed. We argue that a harmony of the Froissart theorem allow us to hear the new notes of {\it ``the music of the spheres"} just in the Pythagoreans sense.