Pseudo-Goldstones from Supersymmetric Wilson Lines on 5D Orbifolds
Abstract
We consider a U(1) gauge theory on the five dimensional orbifold M4× S1/Z2, where A5 has even Z2 parity. This leads to a light pseudoscalar degree of freedom W(x) in the effective 4D theory below the compactification scale arising from a gauge-invariant brane-to-brane Wilson line. As noted by Arkani-Hamed et al in the non-supersymmetric S1 case the 5D bulk gauge-invariance of the underlying theory together with the non-local nature of the Wilson line field leads to the protection of the 4D theory of W(x) from possible large global-symmetry violating quantum gravitational effects. We study the S1/Z2 theory in detail, in particular developing the supersymmetric generalization of this construction, involving a pseudoscalar Goldstone field (the `axion') and its scalar and fermion superpartners (`saxion' and `axino'). The global nature of W(x) implies the absence of independent Kaluza-Klein excitations of its component fields. The non-derivative interactions of the (supersymmetric) Wilson line in the effective 4D theory arising from U(1) charged 5D fields propagating between the boundary branes are studied. We show that, similar to the non-supersymmetric S1 case, these interactions are suppressed by (-π R m) where π R is the size of the extra dimension.
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