On Isometry Anomalies in Minimal N=(0,1) and N=(0,2) Sigma Models

Abstract

The two-dimensional minimal supersymmetric sigma models with homogeneous target spaces G/H and chiral fermions of the same chirality are revisited. We demonstrate that the Moore-Nelson consistency condition revealing a global anomaly in CP(N-1) (with N>2 and N=(0,2) supersymmetry) due to a nontrivial first Pontryagin class is in one-to-one correspondence with the local anomalies of isometries in these models. These latter anomalies are generated by fermion loop diagrams which we explicitly calculate. In the case of O(N) sigma models the first Pontryagin class vanishes, so there is no global obstruction for the minimal N=(0,1) supersymmetrization of these models. We show that at the local level isometries in these models are anomaly free. Thus, there are no obstructions to quantizing the minimal N=(0,1) models with the SN-1= SO(N)/SO(N-1) target space. This also includes CP(1) (equivalent to S2) which is an exceptional case from the CP(N-1) series. We also discuss a relation between the geometric and gauged formulations of the CP(N-1) models.