Tremblay-Turbiner-Winternitz (TTW) system at integer index k: polynomial algebras of integrals
Abstract
An infinite 3-parametric family of superintegrable and exactly-solvable quantum models on a plane, admitting separation of variables in polar coordinates, marked by integer index k was introduced in Journ Phys A 42 (2009) 242001 and was called in literature the TTW system. In this paper it is conjectured that the Hamiltonian and both integrals of TTW system have hidden algebra g(k) - it was checked for k=1,2,3,4 - having its finite-dimensional representation spaces as the invariant subspaces. It is checked that for k=1,2,3,4 that the Hamiltonian H, two integrals I1,2 and their commutator I12 = [ I1, I2] are four generating elements of the polynomial algebra of integrals of the order (k+1): [ I1, I12] = Pk+1(H, I1,2, I12), [ I2, I12] = Qk+1(H, I1,2, I12), where Pk+1,Qk+1 are polynomials of degree (k+1) written in terms of ordered monomials of H, I1,2, I12. This implies that polynomial algebra of integrals is subalgebra of g(k). It is conjectured that all is true for any integer k.
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