Algebraic approach to the forced anharmonic oscillator

A general procedure for an algebraic formulation of the eigenvalue problem for hamiltonians which have both a discrete and a continuum spectrum is introduced. The onedimensional hiorse potential is used as an example, but more comples types of spectra can also be handled. ## 1 _ Introduction The n

A method is presented based on energy balance to derive the Melnikov criterion for a forced oscillator with one degree of freedom. An integration scheme is also discussed for numerically calculating the criterion when the integrals involved cannot be evaluated analytically. The example of the forced

A pure algebraic treatment of the eigenvalue equation corresponding to the asymmetric top is presented. The algebraic method employs the Holstein-Primakoff bosonic realization of the angular momentum algebra. Explicit determination of the linear boson transformation coefficients of the eigenstates i

A new realization of the algebra SU( 1.1). associated nitil the one-dimensional Morse oscillator. is introduced. Thr catculation of the Morse reflection zunpli:udc is then formulrtted via a recently established algebraic npproxh to the sc311erinp matrix In rhis approach the invariance group of the