# The valence band energy spectrum of HgTe quantum wells with inverted   band structures

**Authors:** G.M. Minkov, V.Ya. Aleshkin, O.E. Rut, A.A. Sherstobitov and, A.V. Germanenko, S.A. Dvoretski, N.N. Mikhailov

arXiv: 1705.04717 · 2017-08-02

## TL;DR

This study combines experimental magnetotransport measurements and theoretical modeling to analyze the valence band energy spectrum in HgTe quantum wells, revealing how degeneracy and effective mass depend on well asymmetry and hole density.

## Contribution

It demonstrates that interface mixing and asymmetry reduce valence band degeneracy from 8 to 2, aligning experimental results with refined theoretical models.

## Key findings

- Degeneracy at the valence band top is 2 at low hole densities.
- Effective hole mass is approximately 0.25 times the electron mass.
- Interface effects significantly influence the valence band structure.

## Abstract

The energy spectrum of the valence band in HgTe/Cd$_x$Hg$_{1-x}$Te quantum wells with a width $(8-20)$~nm has been studied experimentally by magnetotransport effects and theoretically in framework $4$-bands $kP$-method. Comparison of the Hall density with the density found from period of the Shubnikov-de Haas (SdH) oscillations clearly shows that the degeneracy of states of the top of the valence band is equal to 2 at the hole density $p< 5.5\times 10^{11}$~cm$^{-2}$. Such degeneracy does not agree with the calculations of the spectrum performed within the framework of the $4$-bands $kP$-method for symmetric quantum wells. These calculations show that the top of the valence band consists of four spin-degenerate extremes located at $k\neq 0$ (valleys) which gives the total degeneracy $K=8$. It is shown that taking into account the "mixing of states" at the interfaces leads to the removal of the spin degeneracy that reduces the degeneracy to $K=4$. Accounting for any additional asymmetry, for example, due to the difference in the mixing parameters at the interfaces, the different broadening of the boundaries of the well, etc, leads to reduction of the valleys degeneracy, making $K=2$. It is noteworthy that for our case two-fold degeneracy occurs due to degeneracy of two single-spin valleys. The hole effective mass ($m_h$) determined from analysis of the temperature dependence of the amplitude of the SdH oscillations show that $m_h$ is equal to $(0.25\pm0.02)\,m_0$ and weakly increases with the hole density. Such a value of $m_h$ and its dependence on the hole density are in a good agreement with the calculated effective mass.

## Full text

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## Figures

13 figures with captions in the complete paper: https://tomesphere.com/paper/1705.04717/full.md

## References

30 references — full list in the complete paper: https://tomesphere.com/paper/1705.04717/full.md

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Source: https://tomesphere.com/paper/1705.04717