Naturality of SL3 quantum trace maps for surfaces

Abstract

Fock-Goncharov's moduli spaces X PGL3,S of framed PGL3-local systems on punctured surfaces S provide prominent examples of cluster X-varieties and higher Teichm\"uller spaces. In a previous paper of the author (arXiv:2011.14765), building on the works of others, the so-called SL3 quantum trace map is constructed for each triangulable punctured surface S and an ideal triangulation of S, as a homomorphism from the stated SL3-skein algebra of the surface to a quantum torus algebra that deforms the ring of Laurent polynomials in the cube-roots of the cluster coordinate variables for the cluster X-chart for X PGL3,S associated to . We develop quantum mutation maps between special subalgebras of the cube-root quantum torus algebras for different triangulations and show that the SL3 quantum trace maps are natural, in the sense that they are compatible under these quantum mutation maps. As an application, the quantum SL3- PGL3 duality map constructed in the previous paper is shown to be independent of the choice of an ideal triangulation.