Gauge Theory on Fuzzy S2 x S2 and Regularization on Noncommutative R4
Abstract
We define U(n) gauge theory on fuzzy S2N x S2N as a multi-matrix model, which reduces to ordinary Yang-Mills theory on S2 x S2 in the commutative limit N -> infinity. The model can be used as a regularization of gauge theory on noncommutative R4θ in a particular scaling limit, which is studied in detail. We also find topologically non-trivial U(1) solutions, which reduce to the known "fluxon" solutions in the limit of R4θ, reproducing their full moduli space. Other solutions which can be interpreted as 2-dimensional branes are also found. The quantization of the model is defined non-perturbatively in terms of a path integral which is finite. A gauge-fixed BRST-invariant action is given as well. Fermions in the fundamental representation of the gauge group are included using a formulation based on SO(6), by defining a fuzzy Dirac operator which reduces to the standard Dirac operator on S2 x S2 in the commutative limit. The chirality operator and Weyl spinors are also introduced.
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