Kauffman Skein Algebras and Quantum Teichmüller Spaces via Factorisation Homology

Abstract: We compute the factorisation homology of the four-punctured sphere and punctured torus over the quantum group $\mathcal{U}_q(\mathfrak{sl}_2)$ explicitly as categories of equivariant modules using the framework of Integrating Quantum Groups over Surfaces' by Ben-Zvi, Brochier, and Jordan. We identify the algebra of invariants (quantum global sections) with the spherical double affine Hecke algebra of type $(C^\vee_1,C_1)$, in the four-punctured sphere case, and with thecyclic deformation' of $U(su_2)$ in the punctured torus case. In both cases, we give an identification with the corresponding quantum Teichm\"uller space as proposed by Teschner and Vartanov as a quantization of the moduli space of flat connections.