The Two-Component Majorana Equation-Novel Derivations and Known Symmetries
Eckart Marsch
DOI: 10.4236/jmp.2011.210137   PDF    HTML     5,307 Downloads   10,576 Views   Citations


We revisit the two-component Majorana equation and derive it in a new form by linearizing the relativistic dispersion relation of a massive particle, in a way similar to that used to derive the Dirac equation. We are using thereby the Pauli spin matrices, corresponding to an irreducible representation of the Lorentz group, and a lucid and transparent algebraic approach exploiting the newly introduced spin-flip operator. Thus we can readily build up the Majorana version of the Dirac equation in its chiral representation. The Lorentz-invariant complex conjugation operation involves the spin-flip operator, and its connection to chiral symmetry is discussed. The eigenfunctions of the Majorana equation are calculated in a concise way.

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E. Marsch, "The Two-Component Majorana Equation-Novel Derivations and Known Symmetries," Journal of Modern Physics, Vol. 2 No. 10, 2011, pp. 1109-1114. doi: 10.4236/jmp.2011.210137.

Conflicts of Interest

The authors declare no conflicts of interest.


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