The Heun operator as a Hamiltonian

Abstract

IIt is shown that the celebrated Heun operator He=-(a0 x3 + a1 x2 + a2 x) d2dx2 + (b0 x2 + b1 x + b2)ddx + c0 x is the Hamiltonian of the sl(2,R)-quantum Euler-Arnold top of spin in a constant magnetic field. For a0 ≠ 0 it is canonically-equivalent to BC1(A1)- Calogero-Moser-Sutherland quantum models, if a0=0, ten known one-dimensional quasi-exactly-solvable problems are reproduced, and if, in addition, b0=c0=0, then four well-known one-dimensional quantal exactly-solvable problems are reproduced. If spin of the top takes (half)-integer value the Hamiltonian possesses a finite-dimensional invariant subspace and a number of polynomial eigenfunctions occurs. Discrete systems on uniform and exponential lattices are introduced which are canonically-equivalent to one described by the Heun operator.