Some historical background on the double-well potential model

Semiclassical connection formulae for n parabolic barrier nre used to derive a qunntization formu!n for the energy levels of an asymmetric double well oscillator. The connection with the phase integral approach to this problem is discussed.

In the formulas given in the previous papers by FrGman and by Frtiman and Myhrman on the eigenvalue problem of the double oscillator, a certain quantity D occurs, which is negligible for energies lying far from the top of the barrier but which is important for energy levels in the immediate neighbor

## Abstract The simultaneous role of electrostatic effects and band‐mixing effects on optical modal gain in two coupled wells is analyzed within the self‐consistent solution of the Poisson and Luttinger–Kohn effective‐mass equations. The analysis is performed for a 1.3‐μm InGaAsP/InP lattice‐matche

It is demonstrated that barriers, like potential wells, can support localised states. However, barrier-localized states are seen to be much more short-lived compared to states localised in potential wells. These features are revealed with reference to a symmetric double-well potential by using the e