Spectral Function and Self-Energy of the One-Dimensional Hubbard Model in the U --> infinity Limit
arXiv:cond-mat/9702237 · doi:10.1007/s002570050359
Abstract
The interpretation of the k dependent spectral functions of the one-dimensional, infinite U Hubbard model obtained by using the factorized wave-function of Ogata and Shiba is revisited. The well defined feature which appears in addition to low energy features typical of Luttinger liquids, and which, close to the Fermi energy, can be interpreted as the shadow band resulting from $2k_F$ spin fluctuations, is further investigated. A calculation of the self-energy shows that, not too close to the Fermi energy, this feature corresponds to a band, i.e. to a solution of the Dyson equation $Ï- ε(k) - Re Σ(k,Ï) =0$.
Latex, 3 pages, 2 figures, to appear in Z. Phys. B, Proceedings of the Euroconfernce on "Correlations in Unconventional Quantum Liquids", Evora, Portugal, October 7 to 11, 1996