1. Identify Standard Model particles as spherical bound states of Elbaz-Novello quantized Friedmann equations involving particle internal gravitational constants G p G

2. Identify Standard Model surface and volume mass distributions surrounding central Kerr black holes with black hole mass equal Standard Model particle mass

3. Solve cubic equations allowing only three Standard Model particle Compton wavelengths in each charge state

4. Predict neutrino masses with cosmic vacuum energy density as lower bound on neutrino energy density

5. Determine charged fermion masses in relation to electron mass, based on charge neutrality of the universe

6. In an Appendix, assign charge ±e/6 to holographic bits of information on the cosmic particle horizon to explain matter dominance over anti-matter