EXPANDING THE CLASS OF SPECTRAL PROBLEMS WITH PARTIAL ALGEBRAIZATION

Abstract

The phenomenon of the partial algebraization in the Schrödinger-type equations with a hidden dynamical symmetry is discussed. A generalization of the Turbiner procedure is proposed which can expand the class of the quasi-exactly-solvable problems. A specific example relevant to a one-dimensional Hamiltonian with the SU(2) hidden symmetry is constructed.