-
CQT Introduction
Online Presentations | 30 Nov 2006 | Contributor(s):: Supriyo Datta
A short overview of this series of four lectures is given.
-
CQT: Concepts of Quantum Transport
Courses | 30 Nov 2006 | Contributor(s):: Supriyo Datta
Note: For an expanded version of these lectures see Datta's 2008 NCN@Purdue Summer School presentations on Nanoelectronics and the Meaning of Resistance. How does the resistance of a conductor change as we shrink its length all the way down to a few atoms? This is a question that...
-
Workspace
Tools | 21 Apr 2006
Development workspace
-
Padre
Tools | 12 Jan 2006 | Contributor(s):: Mark R. Pinto, kent smith, Muhammad A. Alam, Steven Clark, Xufeng Wang, Gerhard Klimeck, Dragica Vasileska
2D/3D devices under steady state, transient conditions or AC small-signal analysis
-
Resonant Tunneling Diodes: an Exercise
Teaching Materials | 06 Jan 2006 | Contributor(s):: H.-S. Philip Wong
This homework assignment was created by H.-S. Philip Wong for EE 218 "Introduction to Nanoelectronics and Nanotechnology" (Stanford University). It includes a couple of simple "warm up" exercises and two design problems, intended to teach students the electronic properties...
-
Introduction to Carbon Nanotube Electronics
Series | 12 Oct 2005 | Contributor(s):: Susan Sinnott
Carbon nanotubes (CNT) have interesting, structure-dependent electronic properties. In particular, CNTs can be a metallic or semiconducting depending on the way in which the carbon atoms are arranged in the CNT walls. The purpose of this learning module is to familiarize students with the basic...
-
Resonant Tunneling Diode Simulator
Tools | 10 Oct 2005 | Contributor(s):: Michael McLennan
Simulate 1D resonant tunneling devices and other heterostructures via ballistic quantum transport
-
MSL Simulator
Tools | 17 Jun 2005 | Contributor(s):: Kyeongjae Cho
Easy-to-use interface for designing and analyzing electronic properties of different nano materials
-
Prophet
Tools | 15 May 2005 | Contributor(s):: Connor S. Rafferty, kent smith, Yang Liu, Derrick Kearney, Steven Clark
Framework for solving systems of partial differential equations (PDEs) in time and 1, 2, or 3 space dimensions