English

Generalized simplicial chiral models

High Energy Physics - Theory 2009-10-31 v2

Abstract

Using the auxiliary field representation of the simplicial chiral models on a (d-1)-dimensional simplex, the simplicial chiral models are generalized through replacing the term Tr(AA\d)(AA^{\d}) in the Lagrangian of these models by an arbitrary class function of AA\dAA^{\d}; V(AA\d)V(AA^{\d}). This is the same method used in defining the generalized two-dimensional Yang-Mills theories (gYM_2) from ordinary YM_2. We call these models, the ``generalized simplicial chiral models''. Using the results of the one-link integral over a U(N) matrix, the large-N saddle-point equations for eigenvalue density function \ro(z)\ro (z) in the weak (\b>\bc\b >\b_c) and strong (\b<\bc\b <\b_c) regions are computed. In d=2, where the model is in some sense related to the gYM_2 theory, the saddle-point equations are solved for \ro(z)\ro (z) in the two regions, and the explicit value of critical point \bc\b_c is calculated for V(B)V(B)=TrBnB^n (B=AA\d)(B=AA^{\d}). For V(BV(B)=TrB2B^2,TrB3B^3, and TrB4B^4, the critical behaviour of the model at d=2 is studied, and by calculating the internal energy, it is shown that these models have a third order phase transition.

Keywords

Cite

@article{arxiv.hep-th/9905199,
  title  = {Generalized simplicial chiral models},
  author = {Masoud Alimohammadi},
  journal= {arXiv preprint arXiv:hep-th/9905199},
  year   = {2009}
}

Comments

14 pages, LaTex, some minor English corrections, will be published in Nuc. Phys. B