Four - loop contributions to long distance quantities in the two-dimensional nonlinear sigma model on a square lattice: Revised numerical estimates
- B. Alles(,)
- Milan U. and
- INFN, Milan
- ,
- ,
- M. Pepe()
- Milan U. and
- INFN, Milan
2 pages
Published in:
- Nucl.Phys.B 562 (1999) 581-582
e-Print:
- hep-lat/9906014 [hep-lat]
Report number:
- BICOCCA-FT-99-17
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Abstract:
We give the correct analytic expression of a finite integral appearing in the four-loop computation of the renormalization-group functions for the two-dimensional nonlinear sigma-model on the square lattice with standard action, explaining the origin of a numerical discrepancy. We revise the numerical expressions of Caracciolo and Pelissetto for the perturbative corrections of the susceptibility and of the correlation length. For the values used in Monte Carlo simulations, N=3, 4, 8, the second perturbative correction coefficient of the correlation length varies by 3%, 4%, 3% respectively. Other quantities vary similarly.Note:
- 2 pages, Revtex, no figures Report-no: Bicocca-FT-99-17
- lattice field theory
- sigma model: nonlinear
- dimension: 2
- renormalization group
- perturbation theory: higher-order
- higher-order: 4
- correction: susceptibility
- correlation: length
- numerical calculations: Monte Carlo
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