On a Lie algebraic approach of quasi-exactly solvable potentials with two known eigenstates

Abstract

We compare two recent approaches of quasi-exactly solvable Schr\" odinger equations, the first one being related to finite-dimensional representations of sl(2,R) while the second one is based on supersymmetric developments. Our results are then illustrated on the Razavy potential, the sextic oscillator and a scalar field model.

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