Due to local system maintenance on Tuesday, September 27th, nanoHUB will be unable to launch simulation jobs on clusters conte, rice, carter, and hansen. We apologize for any inconvenience.
Find information on common issues.
Ask questions and find answers from other users.
Suggest a new site feature or improvement.
Check on status of your tickets.
Nisha Mariam Johnson
how to simulate insulator in a GNRFET with matlab?
Closed | Responses: 0
I want to apply gate voltage on a graphene nanoribbon as a channel in a GNRFET. then I want to solve poisson equation but I need to know the voltage on channel as the boundary...
Fahad Al Mamun
Graphene Nanoribbon Hall Effect
Closed | Responses: 2
I'm new here in the community, and I am currently working on the Hall effect of GNRs.
My question is that, compared to the Hall effect in Graphene, how do I...
How i can solve poisson equation in decoupled mode space NEGF?
I want solve poisson equation in decoupled mode space Negf for graphene nanoribbons ,but...
SPICE Model of Graphene Nanoribbon FETs
12 Jul 2013 | Downloads | Contributor(s): Ying-Yu Chen, Morteza Gholipour, Artem Rogachev, Amit Sangai, Deming Chen
Graphene Nano-Ribbons Field-Effect Transistors HSPICE implementation based on the following two publications:
 Y-Y. Chen, A. Rogachev, A. Sangai, G. Iannaccone, G. Fiori, and D. Chen (2013)....
How to choose the range of convergence for self-consistent solutions for gnrfet?
Closed | Responses: 1
Hi, i’m trying to choose the range of convergence for self-consistent solution of potential(from poisson’s equation) and density ( from NEGF) for graphene nanoribbon field effect...
graphene sheet resistivity
Open | Responses: 1
R=Rs W/L ,where Rs is the sheet resistivity. and it is a constant
Now for graphene, as W decreases, R should also decrease(because Rs is constant).But R increases ,they say no. of conducting...
Ripples and Warping of Graphene: A Theoretical Study
08 Jun 2010 | Online Presentations | Contributor(s): Umesh V. Waghmare
We use first-principles density functional theory based analysis to understand formation of ripples in graphene and related 2-D materials. For an infinite graphene, we show that ripples are linked...
5.0 out of 5 stars
17 Oct 2008 | Tools | Contributor(s): Gianluca Fiori, Giuseppe Iannaccone
3D Poisson/NEGF solver for the simulation of Graphene Nanoribbon, Carbon nanotubes and Silicon Nanowire Transistors.