Skein and cluster algebras with coefficients for unpunctured surfaces
Abstract
We propose a skein model for the quantum cluster algebras of surface type with coefficients. We introduce a skein algebra S,WA of a walled surface (,W), and prove that it has a quantum cluster structure. The walled surfaces naturally generalize the marked surfaces with multi-laminations, which have been used to describe the quantum cluster algebras of geometric type for marked surfaces by Fomin--Thurston [FT18]. Moreover, we give skein theoretic interpretation for some of quasi-homomorphisms [Fra16] between these quantum cluster algebras.
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