The Energy-Levels and Transition Probabilities for a Bounded Linear Harmonic Oscillator

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The first five energy levels and the oscillator strengths for transitions involving the first three states have been numerically computed for a bounded linear harmonic oscillator for various values of the boundary parameter. It is found that for l>3l_0, where l is the length of the box within which the oscillator is confined and l_0 is the classical amplitude of the oscillator when it has energy hv, the bounded oscillator behaves more or less like a free oscillator(in the first few energy levels), while for l<l_0 it has properties closely approaching those of a free particle enclosed in a box.
理論物理学刊行会の論文