Electromagnetic Splitting of Meson Mass


The calculation of meson masses based on the 5D homogeneous space-time quantum projection was shown explicitly in a previous paper. There are no adjustable parameters, except the quark rest mass. In this article, we like to propose two 5 quarks baryons yet unreported; a bound state of the proton and π+, which should have a mass of roughly 33.8 GeV and that of the proton and J/Ψ, which has an approximate mass of 125 GeV close to the already found 6 quarks proton-proton- boson resonance.

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Wong, K. , Dreschhoff, G. and Jungner, H. (2015) Electromagnetic Splitting of Meson Mass. Journal of Modern Physics, 6, 890-901. doi: 10.4236/jmp.2015.67093.

Conflicts of Interest

The authors declare no conflicts of interest.


[1] Wong, K.W., Dreschhoff, G.A.M. and Jungner, H.J.N. (2012) The J/Ψ Meson and the Missing Heavy Baryon Octet. ArXiv:1204.0238v1
[2] Wong, K.W., Dreschhoff, G. and Jungner, H. (2012) On neutrino Oscillations and Predicting the 125 GEV Two Photon Emission State from p-p Collisions Based on the 5D Homogeneous Space-Time Projection Model. Journal of Modern Physics, 3, 1450-1457. http://dx.doi.org/10.4236/jmp.2012.310179
[3] Wong, K.-W., Dreschhoff, G.A.M. and Jungner, H.J.N (2013) The Homogeneous 5D Projection and Realization of Quark and Hadron Masses. ArXiv:1202.5761v3
[4] Aaij, R., et al. (LHCb Collaboration) (2014) Observation of the Resonant Character of the Z(4430)- State. Physical Review Letters, 112, 222002. http://dx.doi.org/10.1103/PhysRevLett.112.222002
[5] Higgs, P.W. (1964) Broken Symmetries and the Masses of Gauge Bosons. Physical Review Letters, 13, 508-509. http://dx.doi.org/10.1103/PhysRevLett.13.508
[6] Wong, K.W., Dreschhoff, G.A.M. and Jungner, H. (2014) The Five Dimension Space-Time Universe—A Creation and Grand Unified Field Theory Model. Scientific Research Publishing, Wuhan.
[7] Guo, S.H., Yang, X.L., Chan, F.T., Wong, K.W. and Ching, W.Y. (1991) Analytic Solution of a Two-Dimensional Hydrogen Atom. II. Relativistic Theory. Physical Review, A43, 1197-1205.
[8] Perelman, G. (2002) The Entropy Formula for Ricci Flow and Its Geometric Applications. ArXiv:math.DG/0211159
[9] Perelman, G. (2003) Ricci Flow with Surgery on Three-Manifolds. ArXiv:math.DG/0303109

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