The Unicity Theorem and the center of the SL3-skein algebra
Abstract
The SL3-skein algebra Sq(S) of a punctured oriented surface S is a quantum deformation of the coordinate algebra of the SL3-character variety of S. When q is a root of unity, we prove the Unicity Theorem for representations of Sq(S), in particular the existence and uniqueness of a generic irreducible representation. Furthermore, we show that the center of Sq(S) is generated by the peripheral skeins around punctures and the central elements contained in the image of the Frobenius homomorphism for Sq(S), a surface generalization of Frobenius homomorphisms of quantum groups related to SL3. We compute the rank of Sq(S) over its center, hence the dimension of the generic irreducible representation.
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