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Volume 6: Number 3: Article 1

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Heim's Theory of Elementary Particle Structures

T. Auerbach and Illobrand von Ludwiger , CH-5412 Gebenstorf, Switzerland

Heim's theory is defined in a 6-dimensional world, in 2 dimensions of which events take place that organize processes in the 3 dimensions of our experience. A very small natural constant, called a "metron," is derived, representing the smallest area that can exist in nature. This leads to the conclusion that space must be composed of a 6- dimensional geometric lattice of very small cells bounded on all sides by metrons. The existence of metrons requires our usual infinitesimal calculus to be replaced by one of finite areas.

The unperturbed lattice represents empty vacuum. Local deformations of the lattice indicate the presence of something other than empty space. If the deformation is of the right form and complexity it acquires the property of mass and inertia. Elementary particles are complex dynamical systems of locally confined interacting lattice distortions. Thus, the theory geometricizes the world by viewing it as a huge assemblage of very small geometric deformations of a 6-dimensional lattice in vacuum. The theory also has significant consequences for cosmology.

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