I particularly like his strain equation

[math]\sum = \frac{a_0}{8 \pi G} \epsilon[/math]

In which the last term is the strain and [math]\frac{a_0}{8 \pi G}[/math] in fact relates somewhat to gravielectromagnetism since:

[math]\frac{1}{R} \frac{\partial m}{\partial R} = \frac{\omega \times \omega \times r}{G} = \frac{a_C}{G}[/math]

It also related to the gravielectric field as

[math]\mathbf{E} = \frac{m}{R^2}[/math]

The only difference is that he has used a scale acceleration and I have used the Coriolis acceleration - both may be the same thing from previous study, since a rotating universe will indeed be responsible for a growing scale factor.