Preprint · Release 19
Log-Spectral Structure and Koide-Like Winding Geometry in Open-Data B⁰ → K*⁰ μ⁺μ⁻ Candidate Spectra
Abstract
This open-data analysis searches B⁰ → K*⁰ μ⁺μ⁻ candidate spectra for log-domain residual structure, active-domain winding, and Koide-like comb geometry. It includes KDE baseline repair, sideband and charm-continuum controls, veto-window covariance, and explicit non-discovery caveats.
Plain-language overview
Research question
Do open B⁰ → K*⁰ μ⁺μ⁻ candidate spectra contain log-domain residual structure, active-domain winding, or Koide-like comb geometry?
Main contribution
- Searches open-data candidate spectra for log-domain residual structure and Koide-like comb geometry.
- Applies KDE baseline repair, sideband and charm-continuum controls, and veto-window covariance.
Evidence type
Current limitations
The analysis states explicit non-discovery caveats and covariance controls; it reports a methodology and search, not a confirmed signal.
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- PUBLIC_DATA_ANALYSIS
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Explicit falsifiers
- The reported structure does not survive frozen sideband, covariance, veto-window, baseline, and out-of-sample tests.
Open obligations
- Freeze code and data versions, publish hashes and exact commands, and obtain unaffiliated reproduction.
Recommended citation
Reyes, R. J. (May 9, 2026). Log-Spectral Structure and Koide-Like Winding Geometry in Open-Data B⁰ → K*⁰ μ⁺μ⁻ Candidate Spectra. Zenodo. https://doi.org/10.5281/zenodo.20164333
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This landing page provides accessible summaries and citation metadata for an archival preprint. The authoritative manuscript and downloadable files are maintained on the Zenodo DOI record. Wave Confinement Theory is an evolving independent framework; claims should be evaluated according to the derivations, simulations, experiments, data analyses, assumptions, and limitations stated in the paper itself.