Field Theory on the q–deformed Fuzzy Sphere II: Quantization

We study the second quantization of field theory on the q–deformed fuzzy sphere for q ∈ R. This is performed using a path integral over the modes, which generate a quasiassociative algebra. The resulting models have a manifest Uq(su(2)) symmetry with a smooth limit q → 1, and satisfy positivity and twisted bosonic symmetry properties. A systematic way to calculate n–point correlators in perturbation theory is given. As examples, the 4–point correlator for a free scalar field theory and the planar contribution to the tadpole diagram in φ theory are computed. The case of gauge fields is also discussed, as well as an operator formulation of scalar field theory in 2q +1 dimensions. An alternative, essentially equivalent approach using associative techniques only is also presented. The proposed framework is not restricted to 2 dimensions.