- #1
SeM
Hi, I was looking for a quantum physics phenomenon including in quantum field theory where the solutions of a related phase-plane system (i.e. the harmonic oscillator) have a spiral sink in the phase portrait?
The harmonic oscillator has saddle points in the phase-portrait, given its eigenvalue signs, however is there a phenomenon one can confirm has a spiral sink (attractor) and no singularities for its general solution form?
The harmonic oscillator has saddle points in the phase-portrait, given its eigenvalue signs, however is there a phenomenon one can confirm has a spiral sink (attractor) and no singularities for its general solution form?