中文

Three Dimensional Nonlinear Sigma Models in the Wilsonian Renormalization Method

高能物理 - 理论 2009-11-10 v2

摘要

The three dimensional nonlinear sigma model is unrenormalizable in perturbative method. By using the β\beta function in the nonperturbative Wilsonian renormalization group method, we argue that N=2{\cal N}=2 supersymmetric nonlinear σ\sigma models are renormalizable in three dimensions. When the target space is an Einstein-K\"{a}hler manifold with positive scalar curvature, such as CPNP^N or QNQ^N, there are nontrivial ultraviolet (UV) fixed point, which can be used to define the nontrivial continuum theory. If the target space has a negative scalar curvature, however, the theory has only the infrared Gaussian fixed point, and the sensible continuum theory cannot be defined. We also construct a model which interpolates between the CPNP^N and QNQ^N models with two coupling constants. This model has two non-trivial UV fixed points which can be used to define the continuum theory. Finally, we construct a class of conformal field theories with SU(N){\bf SU}(N) symmetry, defined at the fixed point of the nonperturbative β\beta function. These conformal field theories have a free parameter corresponding to the anomalous dimension of the scalar fields. If we choose a specific value of the parameter, we recover the conformal field theory defined at the UV fixed point of CPNP^N model and the symmetry is enhanced to SU(N+1){\bf SU}(N+1).

关键词

引用

@article{arxiv.hep-th/0304194,
  title  = {Three Dimensional Nonlinear Sigma Models in the Wilsonian Renormalization Method},
  author = {K. Higashijima and E. Itou},
  journal= {arXiv preprint arXiv:hep-th/0304194},
  year   = {2009}
}

备注

16 pages, 1 figure, references added