The rigid-shell / quantum-length module (rigid_shell.py)

Quantifies gate G-S (Section §11, ledger row E4) by referencing and verifying the master physics whitepaper's forced derivations: the lattice core 82=#R²≤6+1 with R²=7 empty by Legendre, the n-fold rate law ν_n=nπ²⁽ⁿ⁻¹⁾ giving ν₃=3π⁴ and m_p/m_e=6π⁵, and the three-route triangulation of the rotation length D=2λ_C,e=6π⁶r_p=2πλ/A ≈4.854 pm to 0.039%.

)} Quantifies gate G-S (Section §11, ledger row E4) by referencing and verifying the master physics whitepaper's forced derivations: the lattice core 82=#R²≤6+1 with R²=7 empty by Legendre, the n-fold rate law ν_n=nπ²⁽ⁿ⁻¹⁾ giving ν₃=3π⁴ and m_p/m_e=6π⁵, and the three-route triangulation of the rotation length D=2λ_C,e=6π⁶r_p=2πλ/A ≈4.854 pm to 0.039%. It then states the stiff-limit connection

)} Quantifies gate G-S (Section §11, ledger row E4) by referencing and verifying the master physics whitepaper's forced derivations: the lattice core $82=\#\{R^2\le6\}+1$ with R^2=7 empty by Legendre, the -fold rate law $\nu_n=n\pi^{2(n-1)}$ giving $\nu_3=3\pi^4$ and $m_p/m_e=6\pi^5$ , and the three-route triangulation of the rotation length $D=2\lambda_{C,e}=6\pi^6r_p=2\pi\lambda/A \approx4.854$ pm to $0.039\%$ . It then states the stiff-limit connection $L_\star\propto c$ to the fluid selection law. Full source is shipped as rigid_shell.py.