Skein and cluster algebras of unpunctured surfaces for sl3
Abstract
For an unpunctured marked surface , we consider a skein algebra Ssl3,q consisting of sl3-webs on with the boundary skein relations at marked points. We construct a quantum cluster algebra Aqsl3, inside the skew-field FracSsl3,q of fractions, which quantizes the cluster K2-structure on the moduli space ASL3, of decorated SL3-local systems on . We show that the cluster algebra Aqsl3, contains the boundary-localized skein algebra Ssl3,q[∂-1] as a subalgebra, and their natural structures, such as gradings and certain group actions, agree with each other. We also give an algorithm to compute the Laurent expressions of a given sl3-web in certain clusters and discuss the positivity of coefficients. In particular, we show that the bracelets and the bangles along an oriented simple loop in have Laurent expressions with positive coefficients, hence give rise to quantum GS-universally positive Laurent polynomials.
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