Conductance quantum

Last updated October 21, 2023

The conductance quantum, denoted by the symbol $G 0$ , is the quantized unit of electrical conductance. It is defined by the elementary charge e and Planck constant h as:

Note that the conductance quantum does not mean that the conductance of any system must be an integer multiple of G₀. Instead, it describes the conductance of two quantum channels (one channel for spin up and one channel for spin down) if the probability for transmitting an electron that enters the channel is unity, i.e. if transport through the channel is ballistic. If the transmission probability is less than unity, then the conductance of the channel is less than G₀. The total conductance of a system is equal to the sum of the conductances of all the parallel quantum channels that make up the system.^[2]

Derivation

In a 1D wire, connecting two reservoirs of potential $u_{1}$ and $u_{2}$ adiabatically:

The density of states is

{\frac {\mathrm {d} n}{\mathrm {d} \epsilon }}={\frac {2}{hv}},

where the factor 2 comes from electron spin degeneracy, $h$ is the Planck constant, and $v$ is the electron velocity.

The voltage is:

V=-{\frac {(\mu _{1}-\mu _{2})}{e}},

where $e$ is the electron charge.

The 1D current going across is the current density:

j=-ev(\mu _{1}-\mu _{2}){\frac {\mathrm {d} n}{\mathrm {d} \epsilon }}.

This results in a quantized conductance:

G_{0}={\frac {I}{V}}={\frac {j}{V}}={\frac {2e^{2}}{h}}.

Occurrence

Quantized conductance occurs in wires that are ballistic conductors, when the elastic mean free path is much larger than the length of the wire: $l_{\rm {el}}\gg L$ ^{[ clarification needed ]}. B. J. van Wees et al. first observed the effect in a point contact in 1988.^[3] Carbon nanotubes have quantized conductance independent of diameter.^[4] The quantum hall effect can be used to precisely measure the conductance quantum value. It also occurs in electrochemistry reactions^[5] and in association with the quantum capacitance defines the rate with which electrons are transferred between quantum chemical states as described by the quantum rate theory.

Notes

↑ S is the siemens

Reference

↑ "2018 CODATA Value: conductance quantum". The NIST Reference on Constants, Units, and Uncertainty. NIST. 20 May 2019. Retrieved 2019-05-20.
↑ S. Datta, Electronic Transport in Mesoscopic Systems, Cambridge University Press, 1995, ISBN 0-521-59943-1
↑ B.J. van Wees; et al. (1988). "Quantized Conductance of Point Contacts in a Two-Dimensional Electron Gas". Physical Review Letters. 60 (9): 848–850. Bibcode:1988PhRvL..60..848V. doi:10.1103/PhysRevLett.60.848. hdl: 1887/3316 . PMID 10038668.
↑ S. Frank; P. Poncharal; Z. L. Wang; W. A. de Heer (1998). "Carbon Nanotube Quantum Resistors". Science. 280 (1744–1746): 1744–6. Bibcode:1998Sci...280.1744F. CiteSeerX 10.1.1.485.1769 . doi:10.1126/science.280.5370.1744. PMID 9624050.
↑ Bueno, P. R. (2020). "Electron transfer and conductance quantum". Physical Chemistry Chemical Physics. 22 (45): 26109–26112. doi:10.1039/D0CP04522E. PMID 33185207. S2CID 226853811.

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[1] S is the siemens

[physconst-G0-2] "2018 CODATA Value: conductance quantum". The NIST Reference on Constants, Units, and Uncertainty. NIST. 20 May 2019. Retrieved 2019-05-20.

[3] S. Datta, Electronic Transport in Mesoscopic Systems, Cambridge University Press, 1995, ISBN 0-521-59943-1

[4] B.J. van Wees; et al. (1988). "Quantized Conductance of Point Contacts in a Two-Dimensional Electron Gas". Physical Review Letters. 60 (9): 848–850. Bibcode:1988PhRvL..60..848V. doi:10.1103/PhysRevLett.60.848. hdl: 1887/3316 . PMID 10038668.

[5] S. Frank; P. Poncharal; Z. L. Wang; W. A. de Heer (1998). "Carbon Nanotube Quantum Resistors". Science. 280 (1744–1746): 1744–6. Bibcode:1998Sci...280.1744F. CiteSeerX 10.1.1.485.1769 . doi:10.1126/science.280.5370.1744. PMID 9624050.

[6] Bueno, P. R. (2020). "Electron transfer and conductance quantum". Physical Chemistry Chemical Physics. 22 (45): 26109–26112. doi:10.1039/D0CP04522E. PMID 33185207. S2CID 226853811.

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