Wave Physics REAL v1.0 is the L4 structural realization document that instantiates the complete phenomenology of wave propagation — electromagnetic, mechanical, and matter waves — within the constitutional framework of the EET constraint network theory. Building on eighteen mother texts and five completed REALs, this document establishes a unified constitutional foundation for all wave phenomena through six constitutional propositions (P1–P5 plus P-WAVE-0) and a general wave dynamics framework spanning thirty-three sections in Part II, covering the constraint network wave equation, dual-channel damping, resonance and the degeneration corridor, the graph path integral and interference, the U(1) graph connection and polarization, the Capture channel and lasers, wave thermodynamics, solitons, shock waves, Anderson localization, wave turbulence, non-Hermitian wave physics, and transformation optics. The document is distinguished by three features. First, constitutional honesty: the refractive index is explicitly identified as a constitutional open problem inherited from EM v2.0's internal self-consistency crisis. Three candidate forms are juxtaposed, their respective constitutional support levels are documented, and a PM-9 compliant experimental discrimination protocol (P-WAVE-1) is provided. All WORKING HYPOTHESIS entities are explicitly labeled. The wave impedance η₀ = 377 Ω being η-invariant (CLOSED structural form) is registered as the sole constitutionally closed fact constraining the refractive index. Second, nine body-grade controversy resolutions: wave-particle duality is reduced to line graph duality — a theorem of graph theory requiring no supplementary interpretation; quantum measurement is resolved as the Detection → Registration operational chain (Observer v2.4, CLOSED), with the Heisenberg Cut physically located at the Type I/Type II constraint boundary; the wave time arrow is derived from Barrier Asymmetry (Causality v2.0, CLOSED); the spin-statistics theorem is reduced to Type I vertex exclusivity; the Hartman tunneling time controversy is resolved by recognizing tunneling as a Transient Event; neutrino oscillation is identified as a Laplacian quantum beat; gravitational wave memory is identified as the gravitational-domain manifestation of the plastic damping channel; the non-Hermiticity of wave physics is shown to be constitutionally inevitable rather than engineered; and the Wheeler delayed-choice experiment is resolved by recognizing that the photon, as non-matter, has no persistent history. Third, seven academic priority registrations (Appendix X) stake original EET claims on the Abraham-Minkowski momentum controversy (dual-channel decomposition), the Dicke superradiant phase transition no-go theorem (five-channel open-system bypass), non-Hermitian topology classification (natural non-Hermitian graph Laplacian framework), single-bubble sonoluminescence (extreme constraint network Formation cascade), the Unruh effect (causal truncation of N=0 transient constraint events), Quantum Darwinism (Physical Selection Theorem as the general framework), and weak measurement (Truncate + Capture operational chain). The entire content is zero-blocking: all upstream constitutional sources are complete. Five falsifiable predictions (P-WAVE-1 through P-WAVE-5) with full PM-9 compliant statistical specifications are provided. Forty bridge declarations link the document to its twenty-eight mother texts, five companion REALs, and the simultaneously drafted Electronics/Circuit Theory REAL v1.0 through four cross-domain bridges. Keywords: constraint network wave equation, dual-channel damping, graph path integral, U(1) graph connection, Capture channel, degeneration corridor, wave-particle duality, line graph duality, quantum measurement, non-Hermitian wave physics, PT symmetry, exceptional points, Anderson localization, solitons, shock waves, wave turbulence, transformation optics, refractive index constitutional open problem, five-channel complete constraint second law, ringing test, Energy-Efficiency Theory
Hongpu Yang (Sat,) studied this question.