1. Quantum Propagator Derivation for the Ring of Four Harmonically Coupled Oscillators
- Author
-
James Mendoza Gallo and Bienvenido Masirin Butanas Jr.
- Subjects
white noise analysis ,path integrals ,coupled harmonic oscillators ,Science ,Physics ,QC1-999 - Abstract
The ring model of the coupled oscillator has enormously studied from the perspective of quantum mechanics. The research efforts on this system contribute to fully grasp the concepts of energy transport, dissipation, among others, in mesoscopic and condensed matter systems. In this research, the dynamics of the quantum propagator for the ring of oscillators was analyzed anew. White noise analysis was applied to derive the quantum mechanical propagator for a ring of four harmonically coupled oscillators. The process was done after performing four successive coordinate transformations obtaining four separated Lagrangian of a one-dimensional harmonic oscillator. Then, the individual propagator was evaluated via white noise path integration where the full propagator is expressed as the product of the individual propagators. In particular, the frequencies of the first two propagators correspond to degenerate normal mode frequencies, while the other two correspond to non-degenerate normal mode frequencies. The full propagator was expressed in its symmetric form to extract the energy spectrum and the wave function.
- Published
- 2019
- Full Text
- View/download PDF