User:Qtheory/electron magnetic monopole

Electron as a standing wave magnetic monopole

Postulates the electron as 2 co-joining dimensionless magnetic monopoles forming a spherical standing wave. For a brief summary of the theory, refer to the web-site. Proposed magnetic monopole:
 * $$\sigma_m = \frac{2.\pi^2}{3.\alpha^2.e_x.c_x} \;$$

Proposed Electron:


 * $$E_\sigma = 2.t_x.\sigma_m^3 \;$$

Electron mass:


 * $$m_e = m_P.E_\sigma \;$$

Electron wavelength:


 * $$\lambda_e = \frac{2.\pi.l_p}{E_\sigma} \;$$

Electron frequency:


 * $$\lambda_e = \frac{2.\pi.l_p}{E_\sigma.c} \; = \frac{t_p}{2.t_x.\sigma_m^3} \; = \frac{t_p}{t_x}.\frac{1}{2.\sigma_m^3} \;$$

If:
 * α = 137.035 999 074
 * R = 10973731.568 539

Then :
 * me = 9.109 382 322 65e-31 kg
 * e = 1.602 176 513 32e-19 C
 * σm3 = .388 172 035 274e21

Note:


 * me is the rest mass of the electron
 * α is the (inverse) Fine structure constant
 * R∞ is the Rydberg constant
 * e is the Elementary charge
 * tp is Planck time
 * lp is Planck length

dimensionless constants tx, ex, cx convert from Planck units to SI units:
 * $$\frac{t_p}{t_x} = \frac{5.3912...e^{-44}s}{5.3912...e^{-44}} = 1s$$


 * $$\frac{e}{e_x} = \frac{1.6021764...e^{-19}C}{1.6021764...e^{-19}} = 1C$$


 * $$\frac{c}{c_x} = \frac{299792458m/s}{299792458} = 1m/s$$

Standing wave models:

E Schonfeld and P Wilde: Electron and fine structure constant II


 * $$m_{qm} = \frac{\alpha.m_e}{4.\pi.(\pi/\sqrt{2})^3} \;$$


 * $$m_{qm} = m_P.2.t_x.\frac{\alpha}{4.\pi}.(\frac{\sqrt{2}.\sigma_m}{\pi})^3 \;$$

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