Quantum traces for SLn-skein algebras

Abstract

We establish the existence of several quantum trace maps. The simplest one is an algebra map between two quantizations of the algebra of regular functions on the SLn-character variety of a surface S equipped with an ideal triangulation λ. The first is the (stated) SLn-skein algebra S(S). The second X(S,λ) is the Fock and Goncharov's quantization of their X-moduli space. The quantum trace is an algebra homomorphism trX:S(S)X(S,λ) where the reduced skein algebra S(S) is a quotient of S(S). When the quantum parameter is 1, the quantum trace trX coincides with the classical Fock-Goncharov homomorphism. This is a generalization of the Bonahon-Wong quantum trace map for the case n=2. We then define the extended Fock-Goncharov algebra X(S,λ) and show that trX can be lifted to trX:S(S)(S,λ). We show that both trX and trX are natural with respect to the change of triangulations. When each connected component of S has non-empty boundary and no interior ideal point, we define a quantization of the Fock-Goncharov A-moduli space A(S,λ) and its extension A(S,λ). We then show that there exist quantum traces trA:S(S)A(S,λ) and trA:S(S)(S,λ), where the second map is injective, while the first is injective at least when S is a polygon. They are equivalent to the X-versions but have better algebraic properties.