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Pentad and triangular structures behind the Racah matrices

Somewhat unexpectedly, the study of the family of twisted knots revealed a hidden structure behind exclusive Racah matrices $\bar S$, which control non-associativity of the representation product in a peculiar channel $R\otimes \bar R \otimes R \longrightarrow R$. These $\bar S$ are simultaneously symmetric and orthogonal, and therefore admit two decompositions: as quadratic forms, $\bar S \sim {\cal E}^{tr}{\cal E}$, and as operators: $\bar T\bar S\bar T = S T^{-1} S^{-1}$. Here $\bar T$ and $T$ consist of the eigenvalues of the quantum ${\cal R}$-matrices in channels $R\otimes \bar R$ and $R\otimes R$ respectively, $S$ is the second exclusive Racah matrix for $\bar R\otimes R\otimes R \longrightarrow R$ (still orthogonal, but no longer symmetric), and ${\cal E}$ is a {\it triangular} matrix. It can be further used to construct the KNTZ evolution matrix ${\cal B}={\cal E}\bar T^2{\cal E}^{-1}$, which is also triangular and explicitly expressible through the skew Schur and Macdonald functions -- what makes Racah matrices calculable. Moreover, ${\cal B}$ is somewhat similar to Ruijsenaars Hamiltonian, which is used to define Macdonald functions, and gets triangular in the Schur basis. Discovery of this pentad structure $(\bar T,\bar S,S,{\cal E},{\cal B})$, associated with the universal ${\cal R}$-matrix, can lead to further insights about representation theory, knot invariants and Macdonald-Kerov functions.