Noncommutative Chiral Anomaly and the Dirac-Ginsparg-Wilson Operator
Abstract
It is shown that the local axial anomaly in 2-dimensions emerges naturally if one postulates an underlying noncommutative fuzzy structure of spacetime . In particular the Dirac-Ginsparg-Wilson relation on S2F is shown to contain an edge effect which corresponds precisely to the ``fuzzy'' U(1)A axial anomaly on the fuzzy sphere . We also derive a novel gauge-covariant expansion of the quark propagator in the form 1 DAF=aL2+1 DAa where a=22l+1 is the lattice spacing on S2F, L is the covariant noncommutative chirality and DAa is an effective Dirac operator which has essentially the same IR spectrum as DAF but differes from it on the UV modes. Most remarkably is the fact that both operators share the same limit and thus the above covariant expansion is not available in the continuum theory . The first bit in this expansion aL2 although it vanishes as it stands in the continuum limit, its contribution to the anomaly is exactly the canonical theta term. The contribution of the propagator 1 DAa is on the other hand equal to the toplogical Chern-Simons action which in two dimensions vanishes identically .
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