Anharmonic oscillator
Feb, 196930 pages
Published in:
- Phys.Rev. 184 (1969) 1231-1260
View in:
Citations per year
Abstract: (APS)
We consider the anharmonic oscillator defined by the differential equation (−d2dx2+14x2+14λx4)Φ(x)=E(λ)Φ(x) and the boundary condition limit ofΦ(x)asx→±∞=0. This model is interesting because the perturbation series for the ground-state energy diverges. To investigate the reason for this divergence, we analytically continue the energy levels of the Hamiltonian H into the complex λ plane. Using WKB techniques, we find that the energy levels as a function of λ, or more generally of λα, have an infinite number of branch points with a limit point at λ=0. Thus, the origin is not an isolated singularity. Level crossing occurs at each branch point. If we choose α=13, the resolvent (z−H)−1 has no branch cut. However, for all z it has an infinite sequence of poles which have a limit point at the origin. The anharmonic oscillator is of particular interest to field theoreticians because it is a model of λϕ4 field theory in one-dimensional space-time. The unusual and unexpected properties exhibited by this model may give some indication of the analytic structure of a more realistic field theory.References(5)
Figures(0)