Geometric phase and modulus relations for SU(n) matrix elements in the defining representation
Abstract
A set of relations between the modulus and phase is derived for amplitudes of the form (x) where U(x) ∈ SU(n) in the fundamental representation and x denotes the coordinates on the group manifold. An illustration is given for the case n=2 as well as a brief discussion of phase singularities and superoscillatory phase behavior for such amplitudes. The present results complement results obtained previously PMrel1 for amplitudes valued on the ray space R = CPn. The connection between the two is discussed.
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