Unbounded sl3-laminations around punctures
Abstract
We continue to study the unbounded sl3-laminations [IK22], with a focus on their structures at punctures. A key ingredient is their relation to the root data of sl3. After giving a classification of signed sl3-webs around a puncture, we describe the tropicalization of the Goncharov--Shen's Weyl group action in detail. We also clarify the relationship with several other approaches by Shen--Sun--Weng [SSW23] and Fraser--Pylyavskyy [FP21]. Finally, we discuss a formulation of unbounded g-laminations for a general semisimple Lie algebra g in brief.
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