Analytic approximate eigenvalues by a new technique. Application to sextic anharmonic potentials

Abstract

Abstract A new technique to obtain analytic approximant for eigenvalues is presented here by a simultaneous use of power series and asymptotic expansions is presented. The analytic approximation here obtained is like a bridge to both expansions: rational functions, as Pade, are used, combined with elementary functions are used. Improvement to previous methods as multipoint quasirational approximation, MPQA, are also developed. The application of the method is done in detail for the 1-D Schrodinger equation with anharmonic sextic potential of the form V ( x ) = x 2 + λ x 6 and both ground state and the first excited state of the anharmonic oscillator.