Sliced skein algebras and geometric Kauffman bracket

Abstract: The sliced skein algebra of a closed surface of genus $g$ with $m$ punctures, $\mathfrak{S}=\Sigma_{g,m}$, is the quotient of the Kauffman bracket skein algebra $\mathcal{S}\xi(\mathfrak{S})$ corresponding to fixing the scalar values of its peripheral curves. We show that the sliced skein algebra of a finite type surface is a domain if the ground ring is a domain. When the quantum parameter $\xi$ is a root of unity we calculate the center of the sliced skein algebra and its PI-degree. Among applications we show that any smooth point of a sliced character variety is a fully Azumaya point of the skein algebra $\mathcal{S}\xi(\mathfrak{S})$. For any $SL_2(\mathbb{C})$--representation $\rho$ of the fundamental group of an oriented connected 3-manifold $M$ and a root of unity $\xi$ with odd $ord(\xi^2)$, we introduce the $\rho$-reduced skein module $\mathcal{S}{\xi,\rho}(M)$. We show that $\mathcal{S}{\xi,\rho}(M)$ has dimension 1 when $M$ is closed and $\rho$ is irreducible. We also show that if $\rho$ is irreducible the $\rho$-reduced skein module of a handlebody, as a module over the skein algebra of its boundary, is simple and has the dimension equal to the PI-degree of the skein algebra of its boundary.