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Finite compressibility in the low-doping region of the two-dimensional $t{-}J$ model | Massimo Lugas
; Leonardo Spanu
; Federico Becca
; Sandro Sorella
; | Date: |
26 Jun 2006 | Subject: | Strongly Correlated Electrons | Abstract: | We revisit the important issue of charge fluctuations in the two-dimensional $t{-}J$ model by using an improved variational method based on a wave function that contains both the antiferromagnetic and the d-wave superconducting order parameters. In particular, we generalize the wave function introduced some time ago by J.P. Bouchaud, A. Georges, and C. Lhuillier [J. de Physique {f 49}, 553 (1988)] by considering also a {it long-range} spin-spin Jastrow factor, in order to correctly reproduce the small-$q$ behavior of the spin fluctuations. We mainly focus our attention on the physically relevant region $J/t sim 0.4$ and find that, contrary to previous variational ansatz, this state is stable against phase separation for small hole doping. Moreover, by performing projection Monte Carlo methods based on the so-called fixed-node approach, we obtain a clear evidence that the $t{-}J$ model does not phase separate for $J/t lesssim 0.7$ and that the compressibility remains finite close to the antiferromagnetic insulating state. | Source: | arXiv, cond-mat/0606659 | Services: | Forum | Review | PDF | Favorites |
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