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  1. 1D Heterostructure Tool

    04 Aug 2008 | | Contributor(s):: Arun Goud Akkala, Sebastian Steiger, Jean Michel D Sellier, Sunhee Lee, Michael Povolotskyi, Tillmann Christoph Kubis, Hong-Hyun Park, Samarth Agarwal, Gerhard Klimeck, James Fonseca, Archana Tankasala, Kuang-Chung Wang, Chin-Yi Chen, Fan Chen

    Poisson-Schrödinger Solver for 1D Heterostructures

  2. Is the Jacobi matrix in non-linear poisson slover a positivie-definite matrix?

    Closed | Responses: 0

    I have read the papers written by Dr.Zhibin Ren :“NANOSCALE MOSFETS: PHYSICS, SIMULATION AND DESIGN”. and trying to realize the non-linear Poisson solver by myself. when...

    https://nanohub.org/answers/question/713

  3. Computational Electronics HW - Finite Difference Discretization of Poisson Equation

    out of 5 stars 

    11 Jul 2008 | | Contributor(s):: Dragica Vasileska, Gerhard Klimeck

    www.eas.asu.edu/~vasileskNSF

  4. Illinois Tools: Multigrid Tutorial

    out of 5 stars 

    17 Mar 2009 | | Contributor(s):: Nahil Sobh

    Solves the 2D Poisson problem using the Multigrid Method

  5. NEMO5 Overview Presentation

    out of 5 stars 

    17 Jul 2012 | | Contributor(s):: Tillmann Christoph Kubis, Michael Povolotskyi, Jean Michel D Sellier, James Fonseca, Gerhard Klimeck

    This presentation gives an overview of the current functionality of NEMO5.

  6. Poisson Equation Solvers

    out of 5 stars 

    02 Jun 2010 | | Contributor(s):: Dragica Vasileska

    There are two general schemes for solving linear systems: Direct Elimination Methods, and Iterative Methods.All the direct methods are, in some sense, based on the standard Gauss Elimination technique, which systematically applies row operations to transform the original system of equations into...

  7. Poisson Equation Solvers - General Considerations

    out of 5 stars 

    02 Jun 2010 | | Contributor(s):: Dragica Vasileska

    We describe the need for numerical modeling, the finite difference method, the conversion from continuous set to set of matrix equations, types of solvers for solving sparse matrix equations of the form Ax=b that result, for example, from the finite difference discretization of the Poisson Equation.

  8. What is the relationship between the potential obtained through the Poisson equation and the vacuum energy level in semiconductor band diagrams?

    Closed | Responses: 0

    https://nanohub.org/answers/question/1984