Editing Openai/6897769e-4ee4-800f-aba5-69cca34f701c (section)

===== Let’s identify a dimensional equivalence between the Schwarzschild radius and the QAT geometry: =====

rs=2GMc2r_s = \frac{2GM}{c^2}rs=c22GM
This radius defines where escape velocity = c.

Let’s suppose this critical geometry corresponds to a resonance point in QAT, where:
* Photon absorption becomes "trapped" due to energy density on the 4πr² surface.
* The system forms an irreversible curvature — analogous to a black hole horizon.

We could write:

rs↔critical energy density on a 4πr² surfacer_s \leftrightarrow \text{critical energy density on a 4πr² surface}rs↔critical energy density on a 4πr² surface
And since:

GMr2∼Force (inverse square)\frac{GM}{r^2} \sim \text{Force (inverse square)}r2GM∼Force (inverse square)
You can reinterpret this gravitational acceleration as a result of photon exchange thinning with increased surface area — matching 1/r² EM behavior.