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

==== 1. Derive the dipole transition rate for hydrogen 1s→2p1s\to2p1s→2p in SI and compute the rate & recoil, showing how a single photon changes internal energy and sends a tiny momentum to the shell. ====
# Set up a Lindblad master equation for a two‑level system coupled to a photon bath and compute decoherence rate as a function of photon flux and dipole coupling (explicit formula and numbers). This directly links “photon-by-photon → now” to measurable decoherence.
# Compute the exact surface stress SabS_{ab}Sab for a thin charged spherical shell with tension TTT (we already found TTT) and then compute the Newtonian potential jump in the weak field (approximate gravitational effect from the formed mass).
# Write the explicit boundary action Sbdy[A,ψ]S_{\rm bdy}[A,\psi]Sbdy[A,ψ] and perform variation to derive the surface Noether current and the pillbox Maxwell boundary conditions (fully worked).

Which of (1)–(4) would you like me to do now? (I recommend (2) because it connects QAT’s central interpretive claim to a directly testable decoherence scaling law.)