Vacuum resistance

In pilitron physics, vacuum resistance is the potential of vacuum to carry waves (ie. light). If you think about vacuum as being a vibrating string, and each pilitron a wave harmonic, then the speed of light can be explained. If vacuum has no resistance (mass per unit length), then according to the formula for standing waves on a string:


 * $$v = \sqrt{\frac{T}{m/l}}$$

The speed of light should be infinity, or if the tension in vacuum is also 0, then the speed of light should be 0. But because light has a speed, we can reverse the formula to find out the vacuum resistance:


 * $$V_R = \frac{\delta}{c^2} = \frac{M_0}{\ell_P} \approx 6.42366 \times 10^{-129} \mbox{kg}/\mbox{m}$$

Given in Planck units and pilitron quanta, the value reduces to 1.