[Updated: Feb 3, 2019]
Abstract and Introduction
Breaking news: elementary charge e has been calculated for the first time from first principles of the leading comprehensive, fundamental quantum theory known as binary mechanics (BM) [1]. A quantized Coulomb force was defined (eq. 1). Based only on the time-development scalar bit operation [2] [3] and the three quantized units of measurement -- M, L and T (Fig. 1) [4], calculated electrostatic force (eq. 2) accounted for 97.6% of the quantized Coulomb force. Elementary charge e may be derived from three primary physics constants based on energy-space-time quantization (eqs. 3 and 4).
Fig. 1: Secondary Physics Constants Derived From Primary Constants
Abstract and Introduction
Previous work has shown that quanta in the proton and electron bit cycles [1] moved in the same direction under applied magnetic potential fields regardless of the opposite net electric charge of the two quanta groups [2] [3]. This report looked at the effects of an applied electric potential field in either of two directions along the Y axis. Proton and electron cycle quanta moved according to their electric charge as expected from Coulomb's law. Also, both M and L type quanta participate in coding future motion. These findings further demonstrate that the bit function (eqs. 2 and 39 in [4]) in binary mechanics (BM) contains simultaneous position and motion representation.
Fig. 1: Proton Displacement In Electric Fields
Abstract and Introduction
Previous work has shown 1) object displacement after magnetic pulse injections [1] and 2) loss of motion-related inertia states after cooling to zero Kelvin [2]. These findings demonstrated that the bit function (eqs. 2 and 39 in [3]) in binary mechanics (BM) contains simultaneous position and motion representation. Therefore, the bit function is a major advance beyond the quantum mechanics (QM) wave function. Hence, the Heisenberg uncertainty principle has been demoted from fundamental QM precept to "observer effect". This paper replicates the particle motion study [1] adding separate tracking of energy quanta (1-state bits) in the oppositely-charged proton and electron bit cycles. Magnetic pulse injections displaced quanta regardless of electric charge, further supporting the notion that some or all L bits may represent magnetic monopoles. In sum, with eqs. 5 and 6 in [3], bit function M and L bits each have two types: plus or minus charge and right or left direction respectively.
Fig. 1: Proton Displacement After Magnetic Pulses
Legend: Pulses: L bits (Y^ up or Yv down) injected at Tick 0. In length constant L units,
displacement expressed as Y component minus mean(X,Z) translated to zero at Tick 0.