Traces on the skein algebra of the torus

For a surface F, the Kauffman bracket skein module of F×0,1], denoted K(F), admits a natural multiplication which makes it an algebra. When specialized at a complex number t, nonzero and not a root of unity, we have Kt(F), a vector space over C. In this paper, we will use the product-to-sum formula of Frohman and Gelca to show that the vector space Kt(T²) has five distinct traces. One trace, the Yang-Mills measure, is obtained by picking off the coefficient of the empty skein. The other four traces on Kt(T²) correspond to the four singular points of the moduli space of flat SU(2)-connections on the torus.