# Solvable models of an open well and a bottomless barrier in 1-D

**Authors:** Zafar Ahmed, Dona Ghosh, Sachin Kumar, Nihar Turumella

arXiv: 1706.05275 · 2021-06-24

## TL;DR

This paper introduces new exactly solvable one-dimensional potential models for a well and a barrier, providing explicit solutions for bound and scattering states, and exploring their properties and connections.

## Contribution

The paper presents novel solvable models of a well and a barrier in 1-D with explicit analytic solutions for bound and scattering states, including reflection and transmission coefficients.

## Key findings

- Derived exact analytic forms for bound states and scattering coefficients.
- Identified crossover energy where reflection and transmission probabilities are equal.
-  Demonstrated connection between poles of scattering coefficients and bound state eigenvalues.

## Abstract

We present one dimensional potentials $V(x)= V_0[e^{2|x|/a}-1]$ as solvable models of a well $(V_0>0)$ and a barrier ($V_0<0$). Apart from being new addition to solvable models, these models are instructive for finding bound and scattering states from the analytic solutions of Schr{\"o}dinger equation. The exact analytic (semi-classical and quantal) forms for bound states of the well and reflection/transmission $(R/T)$ co-efficients for the barrier have been derived. Interestingly, the crossover energy $E_c$ where $R(E_c)=1/2=T(E_c)$ may occur below/above or at the barrier-top. A connection between poles of these co-efficients and bound state eigenvalues of the well has also been demonstrated.

## Full text

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## Figures

16 figures with captions in the complete paper: https://tomesphere.com/paper/1706.05275/full.md

## References

21 references — full list in the complete paper: https://tomesphere.com/paper/1706.05275/full.md

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Source: https://tomesphere.com/paper/1706.05275