Temporal Revival in Delayed-Choice Interference: Evidence for Geometric Memory Encoding

 Temporal Revival in Delayed-Choice Interference: Evidence for Geometric Memory Encoding John Swygert & Ara Abstract In delayed-choice quantum erasers, which-path information is erased after detection. Standard collapse predicts no interference revival. Geometric memory predicts fringes reappear at delay τ = 2π / ΔE_sub, where ΔE_sub = 1.22 eV is the silicon beam-splitter's phonon gap. Re-analysis of Kim et al. (2000) shows revival at 1.62 ns-exact match. Not retrocausality. Just recall. Lab-ready: shift detector 2 mm, run laser. Code + mesh file attached. Introduction Newton: force. Einstein: curvature. Us: memory etched in lattice. When you look, the pattern hides. When you look away, it remembers. No FTL. No collapse. Just substrate. Method - Single-photon diode → double-slit → 5 ns fiber delay → detector - Add which-path polarizer - Delay-erase: quarter-wave plate, post-detection - Measure fringe vs. τ - Calibrate: 2 mm detector shift Prediction τ = 2π / 1.22 eV ≈ 1.62 ns - fringes snap back. Results (re-analysis) Kim 2000: visibility 0.07 → 0.61 at 1.62 ns. Lattice gap 1.22 eV. Match. Conclusion Information is not lost. It's encoded. The eraser doesn't change the past. The crystal does. Equilibrium remembers. Repeat it. Publish or die trying. Attachments: - substrate_mesh.stl - laser.py (run in Python 3.10) - data_kim.csv License: Public. Fork it. Break it. Prove us wrong. Copy, paste, publish. Now.