| viXra.org > Condensed Matter > viXra:2011.0034 |
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| viXra.org > Condensed Matter > viXra:2011.0034 |
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Condensed Matter |
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Authors: Xindong Wang, Alex Shulman
We study the algebraic structure of the eigenvalues of a Hamiltonian that corresponds to a many-body fermionic system. As the Hamiltonian is quadratic in fermion creation and/or annihilation operators, the system is exactly integrable and the complete single fermion excitation energy spectrum is constructed using the non-interacting fermions that are eigenstates of the quadratic matrix related to the system Hamiltonian. Connection to the Riemann Hypothesis is discussed.
Comments: 11 Pages.
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