Toshiharu Maeda scite author profile

In the previous papers, we studied the 't Hooft-Polyakov (TP) monopole configurations in the U(2) gauge theory on the fuzzy 2-sphere, and showed that they have nonzero topological charges in the formalism based on the Ginsparg-Wilson (GW) relation. In this paper, we will show an index theorem in the TP monopole background, which is defined in the projected space, and provide a meaning of the projection operator. We also extend the index theorem to general configurations which do not satisfy the equation of motion, and show that the configuration space can be classified into the topological sectors. We further calculate the spectrum of the GW Dirac operator in the TP monopole backgrounds, and consider the index theorem in these cases.

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Dynamical generation of a nontrivial index on the fuzzy 2-sphere

Aoki

Iso

Maeda

et al. 2005

Phys. Rev. D

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In the previous paper [28] we studied the 't Hooft-Polyakov (TP) monopole configuration in the U(2) gauge theory on the fuzzy 2-sphere and showed that it has a nonzero topological charge in the formalism based on the Ginsparg-Wilson relation. In this paper, by showing that the TP monopole configuration is stabler than the U(2) gauge theory without any condensation in the Yang-Mills-Chern-Simons matrix model, we will present a mechanism for dynamical generation of a nontrivial index. We further analyze the instability and decay processes of the U(2) gauge theory and the TP monopole configuration.

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Toshiharu Maeda

Erratum: Dynamical generation of a nontrivial index on the fuzzy 2-sphere [Phys. Rev. D71, 045017 (2005)]

Ginsparg-Wilson Dirac operator in monopole backgrounds on the fuzzy 2-sphere

Dynamical generation of a nontrivial index on the fuzzy 2-sphere

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