Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)


SIGMA 18 (2022), 042, 39 pages      arXiv:2104.13848      https://doi.org/10.3842/SIGMA.2022.042

Relating Stated Skein Algebras and Internal Skein Algebras

Benjamin Haïoun
Institut de Mathématiques de Toulouse, France

Received October 07, 2021, in final form May 25, 2022; Published online June 11, 2022

Abstract
We give an explicit correspondence between stated skein algebras, which are defined via explicit relations on stated tangles in [Costantino F., Lê T.T.Q., arXiv:1907.11400], and internal skein algebras, which are defined as internal endomorphism algebras in free cocompletions of skein categories in [Ben-Zvi D., Brochier A., Jordan D., J. Topol. 11 (2018), 874-917, arXiv:1501.04652] or in [Gunningham S., Jordan D., Safronov P., arXiv:1908.05233]. Stated skein algebras are defined on surfaces with multiple boundary edges and we generalise internal skein algebras in this context. Now, one needs to distinguish between left and right boundary edges, and we explain this phenomenon on stated skein algebras using a half-twist. We prove excision properties of multi-edges internal skein algebras using excision properties of skein categories, and agreeing with excision properties of stated skein algebras when $\mathcal{V} = \mathcal{U}_{q^2}(\mathfrak{sl}_2)\text{-}{\rm mod}^{\rm fin}$. Our proofs are mostly based on skein theory and we do not require the reader to be familiar with the formalism of higher categories.

Key words: quantum invariants; skein theory; category theory.

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