Bound states of Klein-Gordon equation for ring-shaped non-spherical harmonic oscillator potentials
环形非球谐振子势Klein-Gordon方程的束缚态

By using the ordinary method of variable separation,the bound states of Klein Gordon equation of the ring shaped non spherical harmonic oscillator with equal scalar and vector potentials are solved. The normalized angular wave function expressed in terms of the universal associated Legendre polynomial and the normalized radial wave function expressed in terms of the confluent hyper geometric function are presented. The exact energy spectrum equations are obtained.