Quantum cluster algebra realization for stated SLn-skein algebras and rotation-invariant bases for polygons

Abstract

We construct a quantum cluster structure on the skew-field of fractions Frac( Sω(S)) of the stated SLn-skein algebra Sω(S), where S is a triangulable pb surface without interior punctures. This work complements the construction for the projected stated skein algebra Sω(S) given by the last two authors. Let Sω fr(S) denote the localization of Sω(S) at the multiplicative set generated by all frozen variables. Let Aω fr(S) and Uω fr(S) (respectively Aω(S) and Uω(S)) denote the quantum cluster algebra and quantum upper cluster algebra associated to Frac( Sω(S)) (respectively Frac( Sω(S))). We prove that \[ Sω(S) = Aω(S) = Uω(S) and Sω fr(S) = Aω fr(S) = Uω fr(S) \] whenever S is a polygon. As a consequence, when S is a polygon, we show that the theta basis of Uω(S) (respectively Uω fr(S)) yields a rotation-invariant basis of Sω(S) (respectively Sω fr(S)) with several desirable properties, including positivity and a natural parametrization.