Representations of the SU(N) T-algebra and the loop representation in 1+1-dimensions
Abstract
We consider the phase-space of Yang-Mills on a cylindrical space-time (S1 × R) and the associated algebra of gauge-invariant functions, the T-variables. We solve the Mandelstam identities both classically and quantum-mechanically by considering the T-variables as functions of the eigenvalues of the holonomy and their associated momenta. It is shown that there are two inequivalent representations of the quantum T-algebra. Then we compare this reduced phase space approach to Dirac quantization and find it to give essentially equivalent results. We proceed to define a loop representation in each of these two cases. One of these loop representations (for N=2) is more or less equivalent to the usual loop representation.
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