# Solvable model of bound states in the continuum (BIC) in one dimension

**Authors:** Zafar Ahmed, Sachin Kumar, Dona Ghosh, Tarit Goswami

arXiv: 1901.11340 · 2021-06-24

## TL;DR

This paper introduces an exactly solvable one-dimensional potential model exhibiting bound states in the continuum (BIC), revealing novel discrete states within a continuum and complex scattering solutions.

## Contribution

It presents the first exactly solvable 1D BIC model with unique discrete states and complex scattering solutions, advancing understanding of BIC phenomena in lower dimensions.

## Key findings

- Existence of discrete, square-integrable, non-degenerate states within the continuum.
- Presence of complex scattering solutions with ambiguous parity.
- An exactly solvable bottomless exponential potential model.

## Abstract

Historically, most of the quantum mechanical results have originated in one dimensional model potentials. However, Von-Neumann's Bound states in the Continuum (BIC) originated in specially constructed, three dimensional, oscillatory, central potentials. One dimensional version of BIC has long been attempted, where only quasi-exactly-solvable models have succeeded but not without instigating degeneracy in one dimension. Here, we present an exactly solvable bottomless exponential potential barrier $V(x)=-V_0[\exp(2|x|/a)-1]$ which for $E<V_0$ has a continuum of non-square-integrable, definite-parity, degenerate states. In this continuum, we show a surprising presence of discrete energy, square-integrable, definite-parity, non-degenerate states. For $E>V_0$, there is again a continuum of complex scattering solutions $\psi(x)$ whose real and imaginary parts though solutions of Schr{\"o}dinger equation yet their parities cannot be ascertained as $C\psi(x)$ is also a solution where $C$ is an arbitrary complex non-real number.

## Full text

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## Figures

8 figures with captions in the complete paper: https://tomesphere.com/paper/1901.11340/full.md

## References

29 references — full list in the complete paper: https://tomesphere.com/paper/1901.11340/full.md

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Source: https://tomesphere.com/paper/1901.11340