Stated SLn-skein modules, roots of unity, and TQFT

Abstract

For a pb surface , two positive integers m,n with m n, and two invertible elements v,ε in a commutative domain R with ε2m = 1, we construct an R-linear isomorphism between the stated SLn-skein algebras Sn(,v) and Sn(,ε v), which restricts to an algebraic ismorphism between subalgebras of Sn(,v) and Sn(,ε v). Using this linear isomorphism, we prove the splitting map c:Sn(,v)→ Sn(Cutc(),v) for the pb surface and the ideal arc c is injective when v2m = 1 and m n. We generalize Barrett's work to the SLn-skein space and stated SLn-skein space. As an application, we prove the splitting map for the marked 3-manifolds is always injective when the quantum parameter v=-1. Let (M,N) be a connected marked 3-manifold with N≠, and let (M,N') be obtained from (M,N) by adding one extra marking. When v4 =1, we prove the R-linear map from Sn(M,N,v) to Sn(M,N',v) induced by the embedding (M,N)→ (M,N') is injective and Sn(M.N',v) = Sn(M,N,v)ROqv(SLn), where Oqv(SLn) is the quantization of the regular function ring of SLn. This shows the splitting map for Sn(M,N,v) is always injective. We formulate the stated SLn-TQFT theory, which generalizes the Costantino and L\e's stated SL2-TQFT theory.