# Universal three-body bound states in mixed dimensions beyond the Efimov   paradigm

**Authors:** Pengfei Zhang, Zhenhua Yu

arXiv: 1704.04754 · 2017-09-27

## TL;DR

This paper predicts new universal three-body bound states in mixed-dimensional systems, extending beyond the Efimov effect, with potential realization in cold atom experiments.

## Contribution

It introduces a new class of universal three-body bound states in mixed dimensions, beyond the Efimov paradigm, with specific scaling laws and experimental feasibility.

## Key findings

- Universal three-body bound states found in specific mixed dimensions
- Binding energies follow a novel logarithmic scaling law
- Potential for experimental observation in cold atom systems

## Abstract

The Efimov effect was first predicted for three particles interacting at an $s$-wave resonance in three dimensions. Subsequent study showed that the same effect can be realized by considering two-body and three-body interactions in mixed dimensions. In this work, we consider the three-body problem of two bosonic $A$ atoms interacting with another single $B$ atom in mixed dimensions: The $A$ atoms are confined in a space of dimension $d_A$ and the $B$ atom in a space of dimension $d_B$, and there is an interspecies $s$-wave interaction in a $d_{\rm int}$-co-dimensional space accessible to both species. We find that when the $s$-wave interaction is tuned on resonance, there emerge an infinite series of universal three-body bound states for $\{d_A,d_B,d_{\rm int}\}=\{2,2,0\}$ and $\{2,3,1\}$. Going beyond the Efimov paradigm, the binding energies of these states follow the scaling $\ln|E_n|\sim-s(n\pi-\theta)^2/4$ with the scaling factor $s$ being unity for the former case and $\sqrt{m_B(2m_A+m_B)}/(m_A+m_B)$ for the latter. We discuss how our mixed dimensional systems can be realized in current cold atom experiment and how the effects of these universal three-body bound states can be detected.

## Full text

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## Figures

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## References

45 references — full list in the complete paper: https://tomesphere.com/paper/1704.04754/full.md

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Source: https://tomesphere.com/paper/1704.04754