The BC1 Elliptic model: algebraic forms, hidden algebra sl(2), polynomial eigenfunctions

Abstract

The potential of the BC1 quantum elliptic model is a superposition of two Weierstrass functions with doubling of both periods (two coupling constants). The BC1 elliptic model degenerates to A1 elliptic model characterized by the Lam\'e Hamiltonian. It is shown that in the space of BC1 elliptic invariant, the potential becomes a rational function, while the flat space metric becomes a polynomial. The model possesses the hidden sl(2) algebra for arbitrary coupling constants: it is equivalent to sl(2)-quantum top in three different magnetic fields. It is shown that there exist three one-parametric families of coupling constants for which a finite number of polynomial eigenfunctions (up to a factor) occur.