Vector models in the large N limit: a few applications

Abstract

In these lecture notes prepared for the 11th Taiwan Spring School, Taipei 1997, and updated for the Saalburg summer school 1998, we review the solutions of O(N) or U(N) models in the large N limit and as 1/N expansions, in the case of vector representations. The general idea is that invariant composite fields have small fluctuations for N large. Therefore the method relies on constructing effective field theories for these composite fields after integration over the initial degrees of freedom. We illustrate these ideas by showing that the large N expansion allows to relate the phib22 theory and the non-linear sigma-model, models which are renormalizable in different dimensions. In the same way large N techniques allow to relate the Gross--Neveu, an example of a theory with four-fermi self-interaction, with a Yukawa-type theory renormalizable in four dimensions, a topic relevant for four dimensional field theory. Among other issues for which large N methods are also useful we will briefly discuss finite size effects and finite temperature field theory, because they involve a crossover between different dimensions. Finally we consider the case of a general scalar V(phib2) field theory, explain how the large N techniques can be generalized, and discuss some connected issues like tricritical behaviour and double scaling limit. Some sections in these notes are directly adapted from the work Zinn-Justin J., 1989, Quantum Field Theory and Critical Phenomena, Clarendon Press (Oxford third ed. 1996).

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