Using the IRC model to quantize gravity

In the IRC model, gravitons are low-energy tachyons trapped between and within sub-atomic particles by the Lorentz contraction. They perceive the tardyons trapping them as having length L$_{\mathrm{V}}\approx $L$_{\mathrm{0}}$*V/c, which is \textgreater the graviton's wavelength $\lambda $. Their frequency $\nu $ is minimal when V$\to \infty $, so $\nu_{\mathrm{V}}=v_{\mathrm{\infty }}$*(1$+$c$^{\mathrm{2}}$/2V$^{\mathrm{2}}+$c$^{\mathrm{4}}$/6V$^{\mathrm{4}}+$...). Within a quark or lepton, the proto-matter's orbit is always tangent to the orbit of the graviton, while external gravitons are only tangent for \textasciitilde 10$^{\mathrm{-21}}$ of the proto-matter's orbit. With a 3-dimensional orbit, this gives the proto-matter a diameter \textasciitilde 8*10$^{\mathrm{-26}}$ m. From the frequency locking assumed by the theory, this gives the gravitons a base frequency \textasciitilde 1.2*10$^{\mathrm{33}}$/sec. From the calculated diameter of the electron, 853 fm, the gravitons there have a V\textasciitilde 10$^{\mathrm{13}}$c and energy of \textasciitilde 38.6 KeV. This gives a rest energy of \textasciitilde -4*10$^{\mathrm{17}} \quad i$eV.