1994
DOI: 10.1016/0920-5632(94)90481-2
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The 1/N expansion of two-dimensional spin models

Abstract: A short review of all available results (perturbative, nonperturbative, and exact) on d-dimensional spin models is presented in order to introduce the discussion of their 1/N expansion at d = 2, where the models are asymptotically free.A general two-dimensional spin model with U(N ) invariance, interpolating between CP N −1 and O(2N ) models, is studied in detail in order to illustrate both the general features of the 1/N expansion on the lattice and the specific techniques devised to extract scaling (field-th… Show more

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Cited by 10 publications
(35 citation statements)
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References 222 publications
(182 reference statements)
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“…Finally we try to extract results for the continuum limit from our data and compare these with predictions obtained from the 1/N-expansion [31][32][33] …”
Section: Physics Results and Comparison With The Large N -Expansionmentioning
confidence: 99%
“…Finally we try to extract results for the continuum limit from our data and compare these with predictions obtained from the 1/N-expansion [31][32][33] …”
Section: Physics Results and Comparison With The Large N -Expansionmentioning
confidence: 99%
“…We consider the lattice action (8.17) which is more convenient for a large-N expansion [123,217,218]. One can easily prove that site-and link-reflection positivity holds for the lattice action (8.17).…”
Section: The Large-n Limit On the Latticementioning
confidence: 99%
“…An appealing feature of 2D CP N −1 models is the possibility of perfoming a systematic 1/N expansion, keeping g fixed, around the large-N saddle-point solution [122,123,166,548], unlike 4D SU (N ) gauge theories. This makes these models particularly interesting, because they allow us to also check general nonperturbative scenarios by analytic calculations, without necessarily resorting to numerical Monte Carlo methods of their lattice formulation.…”
Section: As a Theoretical Laboratorymentioning
confidence: 99%
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“…2-dimensional O(n) spin systems, including the Ising model and the large n limit, are reviewed in [13]. Various aspects (on the lattice and in the continuum) of the exactly solvable n → ∞ limit, using a number of different lattice actions, are reviewed in [14]. Symanzik's improvement program for the 2-dimensional O(n) models are studied in [15,16] and some exact results about the lattice artifacts in the large n limit are given in [12].…”
Section: Introductionmentioning
confidence: 99%