Skein and cluster algebras of unpunctured surfaces for sp4

Abstract

Continuing to our previous work [IY21](arXiv:2101.00643) on the sl3-case, we introduce a skein algebra Ssp4,q consisting of sp4-webs on a marked surface with certain "clasped" skein relations at special points, and investigate its cluster nature. We also introduce a natural Zq-form Ssp4,Zq ⊂ Ssp4,q, while the natural coefficient ring R of Ssp4,q includes the inverse of the quantum integer [2]q. We prove that its boundary-localization Ssp4,Zq[∂-1] is included into a quantum cluster algebra Aqsp4, that quantizes the function ring of the moduli space ASp4,×. Moreover, we obtain the positivity of Laurent expressions of elevation-preserving webs in a similar way to [IY21](arXiv:2101.00643). We also propose a characterization of cluster variables in the spirit of Fomin--Pylyavksyy [FP16](arXiv:1210.1888) in terms of the sp4-webs, and give infinitely many supporting examples on a quadrilateral.

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