Representations of The Coordinate Ring of GLq(3)

Abstract

It is shown that the finite dimensional ireducible representations of the quantum matrix algebra Mq(3) ( the coordinate ring of GLq(3) ) exist only when q is a root of unity ( qp = 1 ). The dimensions of these representations can only be one of the following values: p3 , p3 2 , p3 4 or p3 8 . The topology of the space of states ranges between two extremes , from a 3-dimensional torus S1 × S1 × S1 ( which may be thought of as a generalization of the cyclic representation ) to a 3-dimensional cube [ 0 , 1 ]× [ 0 , 1 ]× [ 0 , 1 ] .

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