Note on Wess-Zumino-Witten models and quasiuniversality in 2+1 dimensions

Abstract

We suggest the possibility that the two-dimensional SU(2)k Wess-Zumino-Witten (WZW) theory, which has global SO(4) symmetry, can be continued to 2+ε dimensions by enlarging the symmetry to SO(4+ε). This is motivated by the three-dimensional sigma model with SO(5) symmetry and a WZW term, which is relevant to deconfined criticality. If such a continuation exists, the structure of the renormalization group flows at small ε may be fixed by assuming analyticity in ε. This leads to the conjecture that the WZW fixed point annihilates with a new, unstable fixed point at a critical dimensionality dc>2. We suggest that dc < 3 for all k, and we compute dc in the limit of large k. The flows support the conjecture that the deconfined phase transition in SU(2) magnets is a ``pseudocritical'' point with approximate SO(5), controlled by a fixed point slightly outside the physical parameter space.