Charles Nash scite author profile

We investigate zero modes of the Dirac operator coupled to an Abelian gauge field in three dimensions. We find that the existence of a certain class of zero modes is related to a specific topological property precisely when the requirement of finite Chern--Simons action is imposed.Comment: 13 pages, 6 figures, uses the macro psbox.tex, replaced by a revised version to be published in Phys. Rev. D. The section on the Seiberg-Witten equations, which contained a sign error, has been removed. This removal leads to further issues which will appear in a future publicatio

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Degeneracy of zero modes of the Dirac operator in three dimensions

Adam

Muratori

Nash

2000

Physics Letters B

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One of the key properties of Dirac operators is the possibility of a degeneracy of zero modes. For the Abelian Dirac operator in three dimensions the question whether such multiple zero modes may exist has remained unanswered until now. Here we prove that the feature of zero mode degeneracy indeed occurs for the Abelian Dirac operator in three dimensions, by explicitly constructing a class of Dirac operators together with their multiple zero modes. Further, we discuss some implications of our results, especially a possible relation to the topological feature of Hopf maps.Comment: Latex file, 7 page

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Hopf instantons and the Liouville equation in target space

2000

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We generalise recent results on Hopf instantons in a Chern--Simons and Fermion theory in a fixed background magnetic field. We find that these instanton solutions have to obey the Liouville equation in target space. As a consequence, these solutions are given by a class of Hopf maps that consist of the composition of the standard Hopf map with an arbitrary rational map.Comment: Latex file, 11 pages, no figure

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The Standard Model Fermion Spectrum From Complex Projective Spaces

Dolan¹,

Nash²

2002

J. High Energy Phys.

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It is shown that the quarks and leptons of the standard model, including a right-handed neutrino, can be obtained by gauging the holonomy groups of complex projective spaces of complex dimensions two and three. The spectrum emerges as chiral zero modes of the Dirac operator coupled to gauge fields and the demonstration involves an index theorem analysis on a general complex projective space in the presence of topologically non-trivial SU(n) × U(1) gauge fields. The construction may have applications in type IIA string theory and non-commutative geometry.

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Charles Nash

Topology and Geometry for Physicists

Zero modes of the Dirac operator in three dimensions

Degeneracy of zero modes of the Dirac operator in three dimensions

Hopf instantons and the Liouville equation in target space

The Standard Model Fermion Spectrum From Complex Projective Spaces

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