The forum discussion centers on the quantum harmonic oscillator's tunneling probabilities, specifically the surprising behavior of these probabilities as the quantum number n increases. The classical oscillator's amplitude A relates to energy E through the formula A² = 2E, while the quantum oscillator's energy levels are quantized as 2E(n) = 2n + 1. Calculations using Wolfram's Mathematica reveal that the tunneling probability decreases slowly with increasing n, contradicting expectations from classical mechanics. The asymptotic behavior of the tunneling probability is approximated as c n^(-1/3), where c is a constant derived from the analysis of the wave function.
PREREQUISITESPhysicists, quantum mechanics students, and researchers interested in quantum tunneling phenomena and the behavior of quantum harmonic oscillators.
