Racah Algebra $R(n)$ from Coalgebraic Structures and Chains of $R(3)$ Substructures

Abstract: The recent interest in the study of higher-rank polynomial algebras related to n-dimensional classical and quantum superintegrable systems with coalgebra symmetry and their connection with the generalised Racah algebra R(n), a higher-rank generalisation of the rank one Racah algebra R(3), raises the problem of understanding the role played by the n − 2 quadratic subalgebras generated by the left and right Casimir invariants (sometimes referred as universal quadratic substructures) from this new perspective. Su… Show more

“…The relationship with the Howe duality, coproduct U(su(1, 1)) ⊗N , Temperley-Lieb algebra, Brauer algebras and Racah polynomials has been discussed in [18]. Recent works [19,20] on the coalgebra approach demonstrated how partial Casimirs provide integrals of motion for a wide range of superintegrable models which close to a quadratic algebra with higher-order Serre-type relations. There, the connection with the Racah algebra R(N) as well as chains of R( 3) was also established.…”

N-dimensional Smorodinsky–Winternitz model and related higher rank quadratic algebra SW(N)

“…The relationship with the Howe duality, coproduct U(su(1, 1)) ⊗N , Temperley-Lieb algebra, Brauer algebras and Racah polynomials has been discussed in [18]. Recent works [19,20] on the coalgebra approach demonstrated how partial Casimirs provide integrals of motion for a wide range of superintegrable models which close to a quadratic algebra with higher-order Serre-type relations. There, the connection with the Racah algebra R(N) as well as chains of R( 3) was also established.…”

N-dimensional Smorodinsky–Winternitz model and related higher rank quadratic algebra SW(N)

“…The relationship with the Howe duality, co-product U(su(1, 1)) ⊗N , Temperley-Lieb algebra, Brauer algebras and Racah polynomials has been discussed in [17]. Recent works [18,19] on the coalgebra approach demonstrated how partial Casimirs provide integrals of motion for a wide range of superintegrable models which close to a quadratic algebra with higher-order Serre-type relations. There, the connection with the Racah algebra R(N ) as well as chains of R(3) was also established.…”

$N$-dimensional Smorodinsky-Winternitz model and related higher rank quadratic algebra ${\cal SW}(N)$