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Generalized hypergeometric series for Racah matrices in rectangular representations

High Energy Physics - Theory 2018-02-13 v1 Mathematical Physics math.MP Representation Theory

Abstract

One of spectacular results in mathematical physics is the expression of Racah matrices for symmetric representations of the quantum group SUq(2)SU_q(2) through the Askey-Wilson polynomials, associated with the qq-hypergeometric functions 4ϕ3{_4\phi_3}. Recently it was shown that this is in fact the general property of symmetric representations, valid for arbitrary SUq(N)SU_q(N), at least for exclusive Racah matrices Sˉ\bar S. The natural question then is what substitutes the conventional qq-hypergeometric polynomials when representations are more general? New advances in the theory of matrices Sˉ\bar S, provided by the study of differential expansions of knot polynomials, suggest that these are multiple sums over Young sub-diagrams of the one, which describes the original representation of SUq(N)SU_q(N). A less trivial fact is that the entries of the sum are not just the factorized combinations of quantum dimensions, as in the ordinary hypergeometric series, but involve non-factorized quantities, like the skew characters and their further generalizations -- as well as associated additional summations with the Littlewood-Richardson weights.

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Cite

@article{arxiv.1712.03647,
  title  = {Generalized hypergeometric series for Racah matrices in rectangular representations},
  author = {A. Morozov},
  journal= {arXiv preprint arXiv:1712.03647},
  year   = {2018}
}

Comments

8 pages

R2 v1 2026-06-22T23:13:51.065Z