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Low-lying excitations in one-dimensional lattice electron systems

We consider a general one-dimensional tight-binding electron model which has a period $P$. For any filling factor $ν$ such that $Pν$ is non-integral, we prove that the model in the infinite volume limit has either a symmetry breaking or a unique ground state with gapless excitations. The proof is based on the idea of Yamanaka, Oshikawa and Affleck (cond-mat/9701141), who extended the Lieb-Schultz-Mattis argument to electron systems.

preprint2004arXivOpen access
Hal Tasaki
cond-mat.str-el
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Hal Tasaki

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