Solution of the Dirac equation in presence of an uniform magnetic field
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In this work we discuss the properties of the solutions of the Dirac equation in presence of an uniform background magnetic field. In particular we focus on the nature of the solutions, their ortho-normality properties and how these solutions depend on the choice of the vector potential giving rise to the magnetic field. We explicitly calculate the spin-sum of the solutions and using it we calculate the propagator of the electron in presence of an uniform background magnetic field.
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Universality of the chiral soliton lattice and its interaction with quark matter
The chiral soliton lattice is a universal feature of gauged Skyrme theory at finite baryon density in magnetic fields, remains unchanged under sub-leading large-Nc corrections, and produces a gapped, shifted Dirac spe...
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