Colored knot polynomials for Pretzel knots and links of arbitrary genus

· 2014 · hep-th · arXiv 1412.2616

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abstract

A very simple expression is conjectured for arbitrary colored Jones and HOMFLY polynomials of a rich $(g+1)$-parametric family of Pretzel knots and links. The answer for the Jones and HOMFLY polynomials is fully and explicitly expressed through the Racah matrix of U_q(SU_N), and looks related to a modular transformation of toric conformal block.

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Shading A-polynomials via huge representations of $U_q(\mathfrak{su}_N)$

hep-th · 2026-05-21 · unverdicted · novelty 6.0

Authors propose shaded A-polynomials A_a(ℓ_b, m_c) for SU(N) via CG chords from huge representations of U_q(su_N) in the classical limit, with examples for knots 3_1, 4_1, 5_1 in su_3.

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Shading A-polynomials via huge representations of $U_q(\mathfrak{su}_N)$ hep-th · 2026-05-21 · unverdicted · none · ref 35 · internal anchor
Authors propose shaded A-polynomials A_a(ℓ_b, m_c) for SU(N) via CG chords from huge representations of U_q(su_N) in the classical limit, with examples for knots 3_1, 4_1, 5_1 in su_3.

Colored knot polynomials for Pretzel knots and links of arbitrary genus

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