Representations of the Kauffamn skein algebra of small surfaces

Abstract

We prove a uniqueness result for finite-dimensional representations of the Kauffman skein algebra SA(S) of a surface S, when A is a root of unity and when the surface S is a sphere with at most four punctures or a torus with at most one puncture. We show that, if two irreducible representations of SA(S) have the same classical shadow and the same puncture invariants, and if this classical shadow is sufficiently generic in the character variety XSL2(C) (S), then the two representations are isomorphic.