1. 1D Heterostructure Tool

   PLG_GROUPS_RESOURCES_THIS_HAS 8.2 Ranking

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   total: updated 22 May 2013
   Users:	1580
   Jobs:	10349
   Avg. exec. time:	3 mins

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   Google/IEEE
   Avg. Review:	3.0 out of 5 stars
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   04 Aug 2008 | Tools | 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

   Poisson-Schrödinger Solver for 1D Heterostructures

2. Comparison of PCPBT Lab and Periodic Potential Lab

   PLG_GROUPS_RESOURCES_THIS_HAS 5.4 Ranking

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   Usage Stats

   total: updated 03 May 2013
   Users:	139

   Reviews & Citations

   Google/IEEE
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   04 Aug 2009 | Online Presentations | Contributor(s): Abhijeet Paul, Samarth Agarwal, Gerhard Klimeck, Junzhe Geng

   This small presentation provides information about the comparison performed for quantum wells made of GaAs and InAs in two different tools. This has been done to benchmark the results from completely two different sets of tools and validate the obtained results. In this presentation we provide the …

3. Nanoelectronic Modeling Lecture 09: Open 1D Systems - Reflection at and Transmission over 1 Step

   PLG_GROUPS_RESOURCES_THIS_HAS 6.7 Ranking

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   Usage Stats

   total: updated 03 May 2013
   Users:	580

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   Google/IEEE
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   30 Dec 2009 | Online Presentations | Contributor(s): Gerhard Klimeck, Dragica Vasileska, Samarth Agarwal

   One of the most elemental quantum mechanical transport problems is the solution of the time independent Schrödinger equation in a one-dimensional system where one of the two half spaces has a higher potential energy than the other. The analytical solution is readily obtained using a scattering …

4. Nanoelectronic Modeling Lecture 10: Open 1D Systems - Transmission through & over 1 Barrier

   PLG_GROUPS_RESOURCES_THIS_HAS 6.7 Ranking

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   Usage Stats

   total: updated 03 May 2013
   Users:	594

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   Google/IEEE
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   30 Dec 2009 | Online Presentations | Contributor(s): Gerhard Klimeck, Dragica Vasileska, Samarth Agarwal

   Tunneling and interference are critical in the understanding of quantum mechanical systems. The 1D time independent Schrödinger equation can be easily solved analytically in a scattering matrix approach for a system of a single potential barrier. The solution is obtained by matching wavefunction …

5. Nanoelectronic Modeling Lecture 11: Open 1D Systems - The Transfer Matrix Method

   PLG_GROUPS_RESOURCES_THIS_HAS 6.9 Ranking

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   Usage Stats

   total: updated 03 May 2013
   Users:	646

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   Google/IEEE
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   30 Dec 2009 | Online Presentations | Contributor(s): Gerhard Klimeck, Dragica Vasileska, Samarth Agarwal, Parijat Sengupta

   The transfer matrix approach is analytically exact, and “arbitrary” heterostructures can apparently be handled through the discretization of potential changes. The approach appears to be quite appealing. However, the approach is inherently unstable for realistically extended devices which …

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