Affine cubic surfaces and character varieties of knots

Berest, Yuri; Samuelson, Peter

doi:10.1016/j.jalgebra.2017.11.015

Cited by 13 publications

(18 citation statements)

References 22 publications

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“…Suppose that α q,t is an element in the Arthamonov-Shakirov algebra whose t = q specialisation is equal to α ∈ Sk s (Σ 2,0 ). Then the specialisation ev s 4 ,s 4 (α s 4 ,s 4 • Ψ(0, 0, 0)) is equal to the Jones polynomial of α, viewed as a knot in S 3 under the standard embedding. Proof.…”

Section: Appendix a Calculation Of Loop Actionsmentioning

confidence: 99%

On the genus two skein algebra

Cooke

Samuelson

2021

Journal of London Math Soc

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We study the skein algebra of the genus 2 surface and its action on the skein module of the genus 2 handlebody. We compute this action explicitly, and we describe how the module decomposes over certain subalgebras in terms of polynomial representations of double affine Hecke algebras. Finally, we show that this algebra is isomorphic to the t = q specialisation of the genus two spherical double affine Hecke algebra recently defined by Arthamonov and Shakirov.

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Section: Appendix a Calculation Of Loop Actionsmentioning

confidence: 99%

On the genus two skein algebra

Cooke

Samuelson

2021

Journal of London Math Soc

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“…Kauffman bracket skein module quantizations have been introduced in [37,47] and further studied along our lines of interest for this paper in [39,70,71]. We will now recall some key definitions and results from these investigations.…”

Section: Kauffman Bracket Skein Modules and Algebrasmentioning

confidence: 99%

The Askey-Wilson algebra and its avatars

Crampé,

Frappat,

Gaboriaud

et al. 2020

Preprint

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The original Askey-Wilson algebra introduced by Zhedanov encodes the bispectrality properties of the eponym polynomials. The name Askey-Wilson algebra is currently used to refer to a variety of related structures that appear in a large number of contexts. We review these versions, sort them out and establish the relations between them. We focus on two specific avatars. The first is a quotient of the original Zhedanov algebra; it is shown to be invariant under the Weyl group of type D 4 and to have a reflection algebra presentation. The second is a universal analogue of the first one; it is isomorphic to the Kauffman bracket skein algebra (KBSA) of the four-punctured sphere and to a subalgebra of the universal double affine Hecke algebra (C ∨ 1 , C 1 ). This second algebra emerges from the Racah problem of U q (sl 2 ) and is related via an injective homomorphism to the centralizer of U q (sl 2 ) in its threefold tensor product. How the Artin braid group acts on the incarnations of this second avatar through conjugation by R-matrices (in the Racah problem) or half Dehn twists (in the diagrammatic KBSA picture) is also highlighted. Attempts at defining higher rank Askey-Wilson algebras are briefly discussed and summarized in a diagrammatic fashion.Keywords: Askey-Wilson algebra, Kauffman bracket skein algebra, U q (sl 2 ) algebra, double affine Hecke algebra, centralizer, universal R-matrix, W (D 4 ) Weyl group, half Dehn twist.

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“…where denotes 8 faces of the octahedral quiver (4.4), {(1,3,5), (2,3,5), (1,4,5), (2,4,5), (1,3,6), (1,4,6), (2,3,6), (2,4,6)}.…”

Section: Character Varieties and Y-variablesmentioning

confidence: 99%

“…We note that the quantum algebra related to the character varieties of the 4-punctured sphere has a relationship [44] with the C ∨ C 1 double affine Hecke algebra of Cherednik [13], whose polynomial representation gives the Askey-Wilson polynomial (see also [40,48]). As the PSL(2; Z) automorphism of the C ∨ C 1 DAHA was used to construct knot invariant related with the categorification [14] (see also [4]), our cluster algebraic formulation may help for such invariants [33]. It should be noted that the quantum trace map of closed paths could be regarded as the expectation value of a supersymmetric line defect in the N = 2 four dimensional theory, which is conjectured to be written in terms of the quantum Fock-Goncharov coordinates, i.e., the quantum cluster Y -variables [27] (see also [26]).…”

Section: Introductionmentioning

confidence: 99%

Note on Character Varieties and Cluster Algebras

Hikami¹

2019

SIGMA

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We use Bonahon-Wong's trace map to study character varieties of the oncepunctured torus and of the 4-punctured sphere. We clarify a relationship with cluster algebra associated with ideal triangulations of surfaces, and we show that the Goldman Poisson algebra of loops on surfaces is recovered from the Poisson structure of cluster algebra. It is also shown that cluster mutations give the automorphism of the character varieties. Motivated by a work of Chekhov-Mazzocco-Rubtsov, we revisit confluences of punctures on sphere from cluster algebraic viewpoint, and we obtain associated affine cubic surfaces constructed by van der Put-Saito based on the Riemann-Hilbert correspondence. Further studied are quantizations of character varieties by use of quantum cluster algebra.

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Affine cubic surfaces and character varieties of knots

Cited by 13 publications

References 22 publications

On the genus two skein algebra

On the genus two skein algebra

The Askey-Wilson algebra and its avatars

Note on Character Varieties and Cluster Algebras

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