Single-electron transistor: Difference between revisions

Schematic of a basic SET and its internal electrical components.

A single-electron transistor (SET) is a sensitive electronic device based on the Coulomb blockade effect. In this device the electrons flow through a tunnel junction between source/drain to a quantum dot (conductive island). Moreover, the electrical potential of the island can be tuned by a third electrode, known as the gate, which is capacitively coupled to the island. The conductive island is sandwiched between two tunnel junctions, ^[1] which are modeled by a capacitor (${\displaystyle C_{D}}$ and ${\displaystyle C_{S}}$) and a resistor (${\displaystyle R_{D}}$ and ${\displaystyle R_{S}}$) in parallel.

History

When Thouless pointed out that the size of a conductor, if made small enough, will affect the electronic properties of the conductor, a new subfield of condensed matter physics was started.^[2] The research that followed during the 1980s was known as the mesoscopic physics, based on the submicron-size system investigated.^[3] This was the starting point of the research related to the single-electron transistor.

The first SET based on the Coulomb blockade was reported in 1986 by Soviet scientists K. K. Likharev and D. V. Averin. ^[4] A couple of years later, T. Fulton and G. Dolan at Bell Labs in the US fabricated and demonstrated how such a device works. ^[5] In 1992 M. A. Kastner demonstrated the importance of the energy levels of the QD.^[6] In the late 1990s and early 2000s, Russian physicists S. P. Gubin, V. V. Kolesov, E. S. Soldatov, A. S. Trifonov, V. V. Khanin, G. B. Khomutov, and S. A. Yakovenko were the first ones to ever make a molecule based SET operational at room temperature. ^[7]

Relevance

The increasing relevance of the Internet of things and the healthcare applications give more relevant impact to the electronic device power consumption. For this purpose, ultra-low-power consumption is one of the main research topics into the current electronics world. The amazing number of tiny computers used in the day-to-day world, e.g. mobile phones and home electronics; requires a significant power consumption level of the implemented devices. In this scenario, the SET has appeared as a suitable candidate to achieve this low power range with high level of device integration.

Applicable areas are among others: supersensitive electrometers, Single-electron spectroscopy, DC current standards, temperature standards, detection of infrared radiation, voltage state logics, charge state logics, programmable single-electron transistor logic. ^[8]

Device

Principle

Schematic of a single-electron transistor.

Left to right: energy levels of source, island and drain in a single-electron transistor for the blocking state (upper part) and transmitting state (lower part).

The SET has, Like the FET, three electrodes: source, drain, and a gate. The main technological difference between the transistor types is in the channel concept. While the channel changes from insulated to conductive with applied gate voltage in the FET, the SET is always insulated. The source and drain are coupled through two tunnel junctions, separated by a metallic or semiconductor-based quantum nanodot (QD)^[9], also known as the "island". The electrical potential of the QD can be tuned with the capacitively coupled gate electrode to alter the resistance, by applying a positive voltage the QD will change from blocking to non-blocking state and electrons will start tunneling to the QD. This phenomenon is knwon as the Coulomb blockade.

The current, ${\displaystyle I,}$ from source to drain follows Ohm's law when ${\displaystyle V_{\rm {SD}}}$ is applied, and it equals ${\displaystyle {\tfrac {V_{\rm {SD}}}{R}},}$ where the main contribution of the resistance, ${\displaystyle R,}$ comes from the tunnelling effects when electrons move from source to QD, and from QD to drain. ${\displaystyle V_{\rm {G}}}$ regulates the resistance of the QD, which regulates the current. This is the exact same behavior as in regular FETs. However, when moving away from the macroscopic scale, the quantum effects will affect the current, ${\displaystyle I.}$

In the blocking state all lower energy levels are occupied at the QD and no unoccupied level is within tunnelling range of electrons originating from the source (green 1.). When an electron arrives at the QD (2.) in the non-blocking state it will fill the lowest available vacant energy level, which will raise the energy barrier of the QD, taking it out of tunnelling distance once again. The electron will continue to tunnel through the second tunnel junction (3.), afterwhich it scatters inelastically and reaches the drain electrode Fermi level (4.).

The energy levels of the QD are evenly spaced with a separation of ${\displaystyle \Delta E.}$ This gives rise to a self-capacitance ${\displaystyle C}$ of the island, defined as: ${\displaystyle C={\tfrac {e^{2}}{\Delta E}}.}$ To achieve the Coulomb blockade, three criteria need to be met: ^[10]

1. The bias voltage must be lower than the elementary charge divided by the self-capacitance of the island: ${\displaystyle V_{\text{bias}}<{\tfrac {e}{C}}}$
2. The thermal energy in the source contact plus the thermal energy in the island, i.e. ${\displaystyle k_{\rm {B}}T,}$ must be below the charging energy: ${\displaystyle k_{\rm {B}}T\ll {\tfrac {e^{2}}{2C}},}$ otherwise the electron will be able to pass the QD via thermal excitation.
3. The tunneling resistance, ${\displaystyle R_{\rm {t}},}$ should be greater than ${\displaystyle {\tfrac {h}{e^{2}}},}$ which is derived from Heisenberg's uncertainty principle. ^[11] ${\displaystyle \Delta E\Delta t=\left({\tfrac {e^{2}}{2C}}\right)(R_{\rm {T}}C)>h,}$ where ${\displaystyle (R_{\rm {T}}C)}$ corresponds to the tunneling time ${\displaystyle \tau }$ and is shown as ${\displaystyle C_{\rm {S}}R_{\rm {S}}}$ and ${\displaystyle C_{\rm {D}}R_{\rm {D}}}$ in the schematic figure of the internal electrical components of the SET. The time (${\displaystyle \tau }$) of electron tunnelling through the barrier is assumed to be negligibly small in comparison with the other time scales. This assumption is valid for tunnel barriers used in single-electron devices of practical interest, where ${\displaystyle \tau \approx 10^{-15}{\text{s}}.}$

If the resistance of all the tunnel barriers of the system is much higher than the quantum resistance ${\displaystyle R_{\rm {t}}={\tfrac {h}{e^{2}}}=25.813~{\text{k}}\Omega ,}$ it is enough to confine the electrons to the island, and it is safe to ignore coherent quantum processes consisting of several simultaneous tunnelling events, i.e. co-tunnelling.

Theory

The background charge of the dielectric surrounding the QD is indicated by ${\displaystyle q_{0}}$. ${\displaystyle n_{\rm {S}}}$ and ${\displaystyle n_{\rm {D}}}$ denote the number of electrons tunnelling through the two tunnel junctions and the total number of electrons is ${\displaystyle n}$. The corresponding charges at the tunnel junctions can be written as:

${\displaystyle q_{\rm {S}}=C_{\rm {S}}V_{\rm {S}}}$

${\displaystyle q_{\rm {D}}=C_{\rm {D}}V_{\rm {D}}}$

${\displaystyle q=q_{\rm {D}}-q_{\rm {S}}+q_{0}=-ne+q_{0},}$

where ${\displaystyle C_{\rm {S}}}$ and ${\displaystyle C_{\rm {D}}}$ are the parasitic leakage capacities of the tunnel junctions. Given the bias voltage, ${\displaystyle V_{b}=V_{\rm {S}}+V_{\rm {D}},}$ you can solve the voltages at the tunnel junctions:

${\displaystyle V_{\rm {S}}={\frac {C_{\rm {D}}V_{b}+ne-q_{0}}{C_{\rm {S}}+C_{\rm {D}}}},}$

${\displaystyle V_{\rm {D}}={\frac {C_{\rm {S}}V_{b}-ne+q_{0}}{C_{\rm {S}}+C_{\rm {D}}}}.}$

The electrostatic energy of a double-connected tunnel junction (like the one in the schematical picture) will be

${\displaystyle E_{C}={\frac {q_{\rm {S}}^{2}}{2C_{\rm {S}}}}+{\frac {q_{\rm {D}}^{2}}{2C_{\rm {D}}}}={\frac {C_{\rm {S}}C_{\rm {D}}V_{b}^{2}+(ne-q_{0})^{2}}{2(C_{\rm {S}}+C_{\rm {D}})}}.}$

The work performed during electron tunnelling through the first and second transitions will be:

${\displaystyle W_{\rm {S}}={\frac {n_{\rm {S}}eV_{b}C_{\rm {D}}}{C_{\rm {S}}+C_{\rm {D}}}},}$

${\displaystyle W_{\rm {D}}={\frac {n_{\rm {D}}eV_{b}C_{\rm {S}}}{C_{\rm {S}}+C_{\rm {D}}}}.}$

Given the standard definition of free energy in the form:

${\displaystyle F=E_{\rm {tot}}-W,}$

where ${\displaystyle E_{\rm {tot}}=E_{C}=\Delta E_{F}+E_{N},}$ we find the free energy of a SET as:

${\displaystyle F(n,n_{\rm {S}},n_{\rm {D}})=E_{C}-W={\frac {1}{C_{\rm {S}}+C_{\rm {D}}}}\left({\frac {1}{2}}C_{\rm {S}}C_{\rm {D}}V_{b}^{2}+(ne-q_{0})^{2}+eV_{b}C_{\rm {S}}n_{\rm {D}}+C_{\rm {D}}n_{\rm {S}}\right).}$

For further consideration, it is necessary to know the change in free energy at zero temperatures at both tunnel junctions:

${\displaystyle \Delta F_{\rm {S}}^{\pm }=F(n\pm 1,n_{\rm {S}}\pm 1,n_{\rm {D}})-F(n,n_{\rm {S}},n_{\rm {D}})={\frac {e}{C_{\rm {S}}+C_{\rm {D}}}}\left({\frac {e}{2}}\pm (V_{b}C_{\rm {D}}+ne-q_{0})\right),}$

${\displaystyle \Delta F_{\rm {D}}^{\pm }=F(n\pm 1,n_{\rm {S}},n_{\rm {D}}\pm 1)-F(n,n_{\rm {S}},n_{\rm {D}})={\frac {e}{C_{\rm {S}}+C_{\rm {D}}}}\left({\frac {e}{2}}\pm (V_{b}C_{\rm {S}}+ne-q_{0})\right),}$

The probability of a tunnel transition will be high when the change in free energy is negative. The main term in the expressions above determines a positive value of ${\displaystyle \Delta F}$ as long as the applied voltage ${\displaystyle V_{b}}$ will not exceed the threshold value, which depends on the smallest capacity in the system. In general, for an uncharged QD (${\displaystyle n=0}$ and ${\displaystyle q_{0}=0}$) for symmetric transitions (${\displaystyle C_{\rm {S}}=C_{\rm {D}}=C}$) we have the condition

${\displaystyle V_{\rm {th}}=|V_{b}|\geq {\frac {e}{2C}},}$

(that is, the threshold voltage is reduced by half compared with a single transition).

Whe the applied voltage is zero, the Fermi level at the metal electrodes will be inside the energy gap. When the voltage increases to the threshold value, tunnelling from left to right occurs, and when the reversed voltage increases above the threshold level, tunnelling from right to left occurs.

The existence of the Coulomb blockade is clearly visible in the current-voltage characteristic of a SET (a graph showing how the drain current depends on the gate voltage). At low gate voltages (in absolute value), the drain current will be zero, and when the voltage increases above the threshold, the transitions behave like an ohmic resistance (both transitions have the same permeability) and the current increases linearly. It should be noted here that the background charge in a dielectric can not only reduce, but completely block the Coulomb blockade. ${\displaystyle q_{0}=\pm (0.5+m)e.}$

In the case where the permeability of the tunnel barriers is very different ${\displaystyle (R_{T1}\gg R_{T2}=R_{T}),}$ a stepwise I-V characteristic of the SET arises. An electron tunnels to the island through the first transition and is retained on it, due to the high tunnel resistance of the second transition. After a certain period of time, the electron tunnels through the second transition, however, this process causes a second electron to tunnel to the island through the first transition. Therefore, most of the time the island is charged in excess of one charge. For the case with the inverse dependence of permeability ${\displaystyle (R_{T1}\ll R_{T2}=R_{T}),}$ the island will be unpopulated and its charge will decrease stepwise.^[12] Only now can we understand the principle of operation of a SET. Its equivalent circuit can be represented as two tunnel junctions connected in series via the QD, perpendicular to the tunnel junctions is another control electrode (gate) connected. The gate electrode is connected to the island through a control tank ${\displaystyle C_{\rm {G}}.}$ The gate electrode can change the background charge in the dielectric, since the gate additionally polarizes the island so that the island charge becomes equal to

${\displaystyle q=-ne+q_{0}+C_{\rm {G}}(V_{\rm {G}}-V_{2}).}$

Substituting this value into the formulas found above, we find new values for the voltages at the transitions:

${\displaystyle V_{\rm {S}}={\frac {(C_{\rm {D}}+C_{\rm {G}})V_{b}-C_{\rm {G}}V_{\rm {G}}+ne-q_{0}}{C_{\rm {S}}+C_{\rm {D}}}},}$

${\displaystyle V_{\rm {D}}={\frac {C_{\rm {S}}V_{b}+C_{\rm {G}}V_{\rm {G}}-ne+q_{0}}{C_{\rm {S}}+C_{\rm {D}}}},}$

The electrostatic energy should include the energy stored on the gate capacitor, and the work performed by the voltage on the gate should be taken into account in the free energy:

${\displaystyle \Delta F_{\rm {S}}^{\pm }={\frac {e}{C_{\rm {S}}+C_{\rm {D}}}}\left({\frac {e}{2}}\pm V_{b}(C_{\rm {D}}+C_{\rm {G}})-V_{\rm {G}}C_{\rm {G}}+ne+q_{0}\right),}$

${\displaystyle \Delta F_{\rm {D}}^{\pm }={\frac {e}{C_{\rm {S}}+C_{\rm {D}}}}\left({\frac {e}{2}}\pm V_{b}C_{\rm {S}}+V_{\rm {G}}C_{\rm {G}}-ne+q_{0}\right).}$

At zero temperatures, only transitions with negative free energy are allowed: ${\displaystyle \Delta F_{\rm {S}}<0}$ or ${\displaystyle \Delta F_{\rm {D}}<0}$. These conditions can be used to find areas of stability in the plane ${\displaystyle V_{b}-V_{\rm {G}}.}$

With increasing voltage at the gate electrode, when the supply voltage is maintainted below the voltage of the Coulomb blockade (i.e. ${\displaystyle V_{b}<{\tfrac {e}{C_{\rm {S}}+C_{\rm {D}}}}}$), the drain output current will oscillate with a period ${\displaystyle {\tfrac {e}{C_{\rm {S}}+C_{\rm {D}}}}.}$ These areas correspond to failures in the field of stability. It should be noted here that the oscillations of the tunnelling current occur in time, and the oscillations in two series-connected junctions have a periodicity in the gate control voltage. The thermal broadening of the oscillations increases to a large extent with increasing temperature.

Temperature Dependence

Various materials have successfully been tested when creating single-electron transistors. However, temperature is a huge factor limiting implementation in available electronical devices. Most of the metallic-based SETs only work at extremely low temperatures.

Single-electron transistor with niobium leads and aluminium island.

As mentioned in bullet 2 in the list above: the electrostatic charging energy must be greater than ${\displaystyle k_{\rm {B}}T}$ to prevent thermal fluctuations affecting the Coulomb blockade. This in turn implies that the maximum allowed island capacitance is inversely proportional to the temperature, and needs to be below 1 aF to make the device operational at room temperature.

The island capacitance is a function of the QD size, and QD <= 3 nm is preferrable when aiming for operation at room temperature. This in turn puts huge restraints on the manufacturability of integrated circuits because of reproducability issues.

CMOS Compatibility

Hybrid SET-FET circuit.

The level of the electrical current of the SET can be amplified enough to work with available CMOS technology by generating a hybrid SET-FET device. ^[13][14]

The EU funded project IONS4SET (#688072)^[15] looks for the manufacturability of SET-FET circuits operative at room temperature. The main goal of this project is to design a SET-manufacturability process-flow for large-scale operations seeking to extend the use of the hybrid Set-CMOS architectures. To assure room temperature operation, single dots of diameters below 5 nm have to be fabricated and located between source and drain with tunnel distances of a few nanometers ^[16]. Up to now there is no reliable process-flow to manufacture a hybrid SET-FET circuit operative at room temperature. In this context, this EU project explores a more feasible way to manufacture the SET-FET circuit by using pillar dimensions of approximately 10 nm ^[17].

See also

• Coulomb blockade
• MOSFET
• Transistor model

References

1. Mahapatra, S.; Vaish, V.; Wasshuber, C.; Banerjee, K.; Ionescu, A.M. (2004). "Analytical Modeling of Single Electron Transistor for Hybrid CMOS-SET Analog IC Design". IEEE Transactions on Electron Devices. 51 (11): 1772–1782. doi:10.1109/TED.2004.837369. ISSN 0018-9383.
2. Thouless, D. J. (1977). "Maximum Metallic Resistance in Thin Wires". Phys. Rev. Lett. 39 (18): 1167–1169. doi:10.1103/PhysRevLett.39.1167.
3. Al'Tshuler, Boris L.; Lee, Patrick A. (1988). "Disordered electronic systems". Physics Today. 41 (12): 36–44. doi:10.1063/1.881139.
4. Averin, D. V.; Likharev, K. K. (1986-02-01). "Coulomb blockade of single-electron tunneling, and coherent oscillations in small tunnel junctions". Journal of Low Temperature Physics. 62 (3–4): 345–373. Bibcode:1986JLTP...62..345A. doi:10.1007/BF00683469. ISSN 0022-2291.
5. "Single-electron transistors". Physics World. 1998-09-01. Retrieved 2019-09-17.
6. Kastner, M. A. (1992-07-01). "The single-electron transistor". Rev. Mod. Phys. 64 (3): 849–858. doi:10.1103/RevModPhys.64.849.
7. Gubin, S. P.; Gulayev, Yu V.; Khomutov, G. B.; Kislov, V. V.; Kolesov, V. V.; Soldatov, E. S.; Sulaimankulov, K. S.; Trifonov, A. S. (2002). "Molecular clusters as building blocks for nanoelectronics: the first demonstration of a cluster single-electron tunnelling transistor at room temperature". Nanotechnology. 13 (2): 185–194. doi:10.1088/0957-4484/13/2/311..
8. Kumar, O.; Kaur, M. (2010). "Single Electron Transistor: Applications & Problems". International Journal of VLSI Design & Communication Systems. 1 (4): 24–29. doi:10.5121/vlsic.2010.1403.
9. Uchida, Ken; Matsuzawa, Kazuya; Koga, Junji; Ohba, Ryuji; Takagi, Shin-ichi; Toriumi, Akira (2000). "Analytical Single-Electron Transistor (SET) Model for Design and Analysis of Realistic SET Circuits". Japanese Journal of Applied Physics. 39 (Part 1, No. 4B): 2321–2324. doi:10.1143/JJAP.39.2321. ISSN 0021-4922.
10. Poole, Charles P. Jr.; Owens, Frank J. (2003). Introduction to Nanotechnology. John Wiley & Sons Inc. ISBN 0-471-07935-9.
11. Wasshuber, Christoph (1997). "2.5 Minimum Tunnel Resistance for Single Electron Charging". About Single-Electron Devices and Circuits (Ph.D.). Vienna University of Technology.
12. Gupta, M. (2016). "A Study of Single Electron Transistor (SET)". International Journal of Science and Research. 5 (1): 474–479. ISSN 2319-7064.
13. Ionescu, A.M.; Mahapatra, S.; Pott, V. (2004). "Hybrid SETMOS Architecture With Coulomb Blockade Oscillations and High Current Drive". IEEE Electron Device Letters. 25 (6): 411–413. doi:10.1109/LED.2004.828558. ISSN 0741-3106.
14. Amat, Esteve; Bausells, Joan; Perez-Murano, Francesc (2017). "Exploring the Influence of Variability on Single-Electron Transistors Into SET-Based Circuits". IEEE Transactions on Electron Devices. 64 (12): 5172–5180. doi:10.1109/TED.2017.2765003. ISSN 0018-9383.
15. "IONS4SET Website". Retrieved 2019-09-17.
16. Klupfel, F. J.; Burenkov, A.; Lorenz, J. (2016). "Simulation of silicon-dot-based single-electron memory devices": 237–240. doi:10.1109/SISPAD.2016.7605191. {{cite journal}}: Cite journal requires |journal= (help)
17. ref name="Xu2019">A bot will complete this citation soon. Click here to jump the queue arXiv:1906.09975v2.