Finiteness and dimension of stated skein modules over Frobenius

Abstract

When the quantum parameter q1/2 is a root of unity of odd order. The stated skein module Sq1/2(M,N) has an S1(M,N)-module structure, where (M,N) is a marked three manifold. We prove Sq1/2(M,N) is a finitely generated S1(M,N)-module when M is compact, which furthermore indicates the reduced stated skein module for the compact marked three manifold is finite dimensional. We also give an upper bound for the dimension of Sq1/2(M,N) over S1(M,N) when M is compact. For a pb surface , we use Sq1/2()(N) to denote the image of the Frobenius map when q1/2 is a root of unity of odd order N. Then Sq1/2()(N) lives in the center of the stated skein algebra Sq1/2(). Let Sq1/2()(N) be the field of fractions of Sq1/2()(N), and Sq1/2() be Sq1/2()Sq1/2()(N) Sq1/2()(N). Then we show the dimension of Sq1/2() over Sq1/2()(N) is N3r() where r() equals to the number of boundary components of minus the Euler characteristic of .