miniboone_lsnd_structure
plain-language theorem explainer
MiniBooNE/LSND structure theorem asserts that the structural input from MiniBooNE and LSND experiments satisfies the flyby anomaly ledger condition. Experimentalists working on short-baseline neutrino anomalies would cite it to connect their data to the flyby anomaly predictions within the Recognition Science ledger. The proof is a direct one-line term application of the flyby anomaly structure theorem.
Claim. The structural input from the MiniBooNE and LSND experiments holds, where this input is defined to coincide exactly with the flyby anomaly ledger proposition.
background
In the Experimental module the flyby anomaly structure theorem proves that the flyby anomaly from ledger follows from the Atomki X17 structure. The MiniBooNE/LSND from ledger is introduced as a definition that sets this proposition equal to the flyby anomaly from ledger. This placement allows experimental neutrino data to inherit the structural implications already established for the flyby anomaly.
proof idea
The proof is a one-line term wrapper that directly invokes the flyby anomaly structure theorem. Because the MiniBooNE/LSND from ledger definition is exactly the flyby anomaly from ledger proposition, the application of the prior theorem discharges the goal immediately.
why it matters
This declaration embeds the MiniBooNE and LSND experimental structures into the Recognition Science framework by reducing them to the flyby anomaly ledger. It extends the chain from the Atomki X17 structure through the flyby anomaly to neutrino anomaly data. No open questions are directly addressed, but it provides a structural bridge for future numerical comparisons.
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