Normal view MARC view ISBD view

Analytical Modelling of Breakdown Effect in Graphene Nanoribbon Field Effect Transistor [electronic resource] / by Iraj Sadegh Amiri, Mahdiar Ghadiry.

By: Amiri, Iraj Sadegh [author.].
Contributor(s): Ghadiry, Mahdiar [author.] | SpringerLink (Online service).
Material type: materialTypeLabelBookSeries: SpringerBriefs in Applied Sciences and Technology: Publisher: Singapore : Springer Nature Singapore : Imprint: Springer, 2018Edition: 1st ed. 2018.Description: IX, 86 p. 55 illus., 16 illus. in color. online resource.Content type: text Media type: computer Carrier type: online resourceISBN: 9789811065507.Subject(s): Microtechnology | Microelectromechanical systems | Electronic circuits | Nanotechnology | Microsystems and MEMS | Electronic Circuits and Systems | NanotechnologyAdditional physical formats: Printed edition:: No title; Printed edition:: No titleDDC classification: 621.381 Online resources: Click here to access online
Contents:
Introduction on Scaling Issues of Conventional Semiconductors -- Basic Concept of Field Effect Transistors -- Methodology for Modelling of Surface Potemntial, Ionization and Breakdown of Graphene Field Effect Transistors -- Results and Discussion on Ionization and Breakdown of Grapehene Field Efffect Transistor -- Conclusion and Futureworks on High Voltage Application of Graphene.
In: Springer Nature eBookSummary: This book discusses analytical approaches and modeling of the breakdown voltage (BV) effects on graphene-based transistors. It presents semi-analytical models for lateral electric field, length of velocity saturation region (LVSR), ionization coefficient (α), and breakdown voltage (BV) of single and double-gate graphene nanoribbon field effect transistors (GNRFETs). The application of Gauss’s law at drain and source regions is employed in order to derive surface potential and lateral electric field equations. LVSR is then calculated as a solution of surface potential at saturation condition. The ionization coefficient is modelled and calculated by deriving equations for probability of collisions in ballistic and drift modes based on the lucky drift theory of ionization. The threshold energy of ionization is computed using simulation and an empirical equation is derived semi-analytically. Lastly avalanche breakdown condition is employed to calculate the lateral BV. On the basis of this, simple analytical and semi-analytical models are proposed for the LVSR and BV, which could be used in the design and optimization of semiconductor devices and sensors. The proposed equations are used to examine BV at different channel lengths, supply voltages, oxide thickness, GNR widths, and gate voltages. Simulation results show that the operating voltage of FETs could be as low as 0.25 V in order to prevent breakdown. However, after optimization, it can go as high as 1.5 V. This work is useful for researchers working in the area of graphene nanoribbon-based transistors.
    average rating: 0.0 (0 votes)
No physical items for this record

Introduction on Scaling Issues of Conventional Semiconductors -- Basic Concept of Field Effect Transistors -- Methodology for Modelling of Surface Potemntial, Ionization and Breakdown of Graphene Field Effect Transistors -- Results and Discussion on Ionization and Breakdown of Grapehene Field Efffect Transistor -- Conclusion and Futureworks on High Voltage Application of Graphene.

This book discusses analytical approaches and modeling of the breakdown voltage (BV) effects on graphene-based transistors. It presents semi-analytical models for lateral electric field, length of velocity saturation region (LVSR), ionization coefficient (α), and breakdown voltage (BV) of single and double-gate graphene nanoribbon field effect transistors (GNRFETs). The application of Gauss’s law at drain and source regions is employed in order to derive surface potential and lateral electric field equations. LVSR is then calculated as a solution of surface potential at saturation condition. The ionization coefficient is modelled and calculated by deriving equations for probability of collisions in ballistic and drift modes based on the lucky drift theory of ionization. The threshold energy of ionization is computed using simulation and an empirical equation is derived semi-analytically. Lastly avalanche breakdown condition is employed to calculate the lateral BV. On the basis of this, simple analytical and semi-analytical models are proposed for the LVSR and BV, which could be used in the design and optimization of semiconductor devices and sensors. The proposed equations are used to examine BV at different channel lengths, supply voltages, oxide thickness, GNR widths, and gate voltages. Simulation results show that the operating voltage of FETs could be as low as 0.25 V in order to prevent breakdown. However, after optimization, it can go as high as 1.5 V. This work is useful for researchers working in the area of graphene nanoribbon-based transistors.

There are no comments for this item.

Log in to your account to post a comment.