Binary Mechanics Electron, Positron and Proton

Updated: May 24, 2010
This note presents aspects of the geometry of the electron, positron and proton using binary mechanics.

Fig. 1A shows the electron consists of three "intercube loops" converging at spot 111 (or generally, IJK where I, J and K are all odd integer lattice coordinates). For example, a mite at spot 111 will circulate in one of three loops, depending on the orientation of its spot unit. If spot 111 contains three mites, with no other mites at other locations in its three loops, presumably this is an electron in the lowest possible energy state.

Fig 1A

Lorentz Force in Binary Mechanics

Updated: July 30, 2011
At relatively low bit densities, the Lorentz force is consistent with binary mechanics^[1] (BM), with which this note assumes familiarity.

BM predicts that experimental data for particle events approaching the level of fineness of single BM bits will tend to show anomalies when evaluated with conventional quantum mechanics (QM), which assumes the components of the electromagnetic four-potential (Φ,A) can be defined at arbitrary spatial points in continuous space-time. On the other hand, the BM model quantizes both space and time and assigns each component to slightly different spatial locations (Figs. 1A-1C, 2B-2D).

Binary Mechanics

by James J Keene
© 1994-2011 James J Keene. All Rights Reserved.
Binary Mechanics™ is a trademark of James J Keene

Written in 1994, this paper was last updated May 24, 2011.

CONTENTS
INTRODUCTION
THE THEORY OF BINARY MECHANICS The Spot Unit
Unconditional Bit Motion
Electromagnetic Force SCALAR POTENTIAL
VECTOR POTENTIAL
Gravitational Force
Energy Conservation
Three Dimensional Spatial Format
Strong Force
Scattering
Electrons, Positrons and d Quarks and Antiquarks1. Spot Electric Charge
2. Spot Handedness
3. Spot Color Charge
SU(3) Symmetry Matrices
Number of d Quark Spots
Photons and Gluons
Lite Scattering Interactions
Neutrinos
Electroweak Force
Grand Unification
Pauli Spin Matrices
Four-Momentum Operator
Electromagnetic Four-Potential
Intrinsic Limitations of the Wave Function