Addressing Infinities in the Lévy-Leblond Hamiltonian

Abstract: We attempt to shed light on the following question: What happens to the negative energy states when we take the non-relativistic limit of the Dirac equation? The Levy-Leblond equation is the non-relativistic limit of the Dirac equation and describes fermions in the non-relativistic limit. The Levy-Leblond equation includes singular matrices and an attempt to write the Hamiltonian appears to show that the negative energy states are "buried" under an infinity. We attempt to isolate the infinite energy states and also present an equivalent way of viewing the Schrodinger dispersion relation. We propose that the Levy-Leblond equation can also be seen as resulting from the contribution of enhanced Lorentz violating terms to the Dirac equation.