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Racah coefficients and extended HOMFLY polynomials for all 5-, 6- and 7-strand braids

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abstract

Basing on evaluation of the Racah coefficients for SU_q(3) (which supported the earlier conjecture of their universal form) we derive explicit formulas for all the 5-, 6- and 7-strand Wilson averages in the fundamental representation of arbitrary SU(N) group (the HOMFLY polynomials). As an application, we list the answers for all 5-strand knots with 9 crossings. In fact, the 7-strand formulas are sufficient to reproduce all the HOMFLY polynomials from the katlas.org: they are all described at once by a simple explicit formula with a very transparent structure. Moreover, would the formulas for the relevant SU_q(3) Racah coefficients remain true for all other quantum groups, the paper provides a complete description of the fundamental HOMFLY polynomials for all braids with any number of strands.

fields

math-ph 1

years

2025 1

verdicts

UNVERDICTED 1

representative citing papers

The HZ character expansion and a hyperbolic extension of torus knots

math-ph · 2025-05-15 · unverdicted · novelty 6.0

Authors introduce the HZ character expansion of the HOMFLY-PT polynomial, identify hook diagrams for factorisability, and construct an infinite family of HZ-factorisable hyperbolic knots via full, partial-full, and Jucys-Murphy twists, plus a decomposition conjecture proven for three strands.

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  • The HZ character expansion and a hyperbolic extension of torus knots math-ph · 2025-05-15 · unverdicted · none · ref 5 · internal anchor

    Authors introduce the HZ character expansion of the HOMFLY-PT polynomial, identify hook diagrams for factorisability, and construct an infinite family of HZ-factorisable hyperbolic knots via full, partial-full, and Jucys-Murphy twists, plus a decomposition conjecture proven for three strands.