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Angular Momentum Minimal Magnetization of an Elementary Quantum Fermion System

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DOI: 10.4236/jmp.2013.45092    5,995 Downloads   7,208 Views   Citations
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ABSTRACT

I consider, in a Quantum Field Theory theoretical approach, the effects of an electromagnetic field on the components of the total angular momentum of an elementary fermion system, assuming the minimal form of the relative interaction. When the electromagnetic field can be treated as a classical one, these effects are particularly simple to be computed and exhibit a number of very general characteristic features in the case of a constant magnetic field. A qualitative possible analogy with similar features of an elementary organic system is finally proposed.

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Conflicts of Interest

The authors declare no conflicts of interest.

Cite this paper

C. Verzegnassi, "Angular Momentum Minimal Magnetization of an Elementary Quantum Fermion System," Journal of Modern Physics, Vol. 4 No. 5, 2013, pp. 638-643. doi: 10.4236/jmp.2013.45092.

References

[1] Auditorium Wartsila Italia SpA, “On the Relationship between Cancer Stem Cells, Cancer and Neurodegenerative Illnesses,” Bagnoli della Rosandra, Trieste, 15th February 2012.
[2] AMeC, Association for Medicine and Complexity/Medicine and Complexity Association.
[3] Consiglio Nazionale delle Ricerche, “Non Ionizing High Frequency EM Radiation: Researching the Epidemiological and Chemical Evidences,” First International Medical Scientific Congress, Rome, 29-30 November 1999.
[4] P. Girdinio, “An Introduction to Electromagnetic Fields and Their Biological Effects,” First International Medical Scientific Congress, Rome, 29-30 November 1999, p. 133.
[5] C. Ventura, et al., FASEB Journal, Vol. 19, 2005, p. 155.
[6] C. Ventura, et al., Cell Transplant, Vol. 6, 2012, p. 1225.
[7] M. E. Peskin and D. V. Schroeder, “An Introduction to quantum field theory,” Addison-Wesley, Reading, 1995.
[8] E. Noether, Gott. Nachr., Vol. 1918, 1918, pp. 235-257.
[9] A. Messiah, “Quantum Mechanics,” Dover, 1999.
[10] N. N. Bogoliukov and D. V. Shirkov, “Introduction to the Theory of Quantized Fields,” Interscience Publishers, 1959.
[11] A. Bassi, M. Biava, F. Burigana and C. Verzegnassi, Work in Preparation.
[12] M. Biava, Private Communication.

  
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