Arbitrary spin polarization for the incident wave
Hi all, I am working on a spin resolved scattering problem using Kwant. The setup is a simple heterojunction composed of normal metal and spin-orbit coupled systems. I want to calculate the probabilities of spin-flipped and spin-conserved reflection. In the normal metal, I use two lattices for spin-up and spin-down states, and the calculation went well. The probabilities for spin-flipped and spin-conserved reflection can be read through inter- and intra-lattice scattering. Now I want to calculate the scattering problem for an incident wave with spin polarization in the x-direction. My question: how to set the incident spin state along the x-direction and calculate the corresponding spin-flipped (spin in -x direction) and spin-conserved scattering probabilities? Thanks very much! Best, Wei -- College of Science, University of Aeronautics and Astronautics, Nanjing, 210016, P. R. China E-mail: pchenweis@gmail.com <pchenweis@163.com>, weichenphy@nuaa.edu.cn
Hi Wei, Please check tutorial for dealing with conserved quantities, that we introduced in the latest version of Kwant. That approach allows you to easily compute spin conductance along any direction (and you don't have to manually introduce sublattices). For more details please see the tutorial: https://kwant-project.org/doc/1/tutorial/superconductors#superconductors-orb... Best, Anton On Tue, Jan 23, 2018 at 1:27 PM, Wei Chen <pchenweis@gmail.com> wrote:
Hi all,
I am working on a spin resolved scattering problem using Kwant. The setup is a simple heterojunction composed of normal metal and spin-orbit coupled systems. I want to calculate the probabilities of spin-flipped and spin-conserved reflection. In the normal metal, I use two lattices for spin-up and spin-down states, and the calculation went well. The probabilities for spin-flipped and spin-conserved reflection can be read through inter- and intra-lattice scattering. Now I want to calculate the scattering problem for an incident wave with spin polarization in the x-direction.
My question: how to set the incident spin state along the x-direction and calculate the corresponding spin-flipped (spin in -x direction) and spin-conserved scattering probabilities?
Thanks very much!
Best, Wei
--
College of Science, University of Aeronautics and Astronautics, Nanjing, 210016, P. R. China
E-mail: pchenweis@gmail.com,
weichenphy@nuaa.edu.cn
Hi Anton, That's great! Thanks for the quick response. Best, Wei 2018-01-23 15:08 GMT+01:00 Anton Akhmerov <anton.akhmerov+kd@gmail.com>:
Hi Wei,
Please check tutorial for dealing with conserved quantities, that we introduced in the latest version of Kwant. That approach allows you to easily compute spin conductance along any direction (and you don't have to manually introduce sublattices). For more details please see the tutorial: https://kwant-project.org/doc/1/tutorial/superconductors# superconductors-orbital-degrees-of-freedom-conservation-laws-and- symmetries
Best, Anton
On Tue, Jan 23, 2018 at 1:27 PM, Wei Chen <pchenweis@gmail.com> wrote:
Hi all,
I am working on a spin resolved scattering problem using Kwant. The setup is a simple heterojunction composed of normal metal and spin-orbit coupled systems. I want to calculate the probabilities of spin-flipped and spin-conserved reflection. In the normal metal, I use two lattices for spin-up and spin-down states, and the calculation went well. The probabilities for spin-flipped and spin-conserved reflection can be read through inter- and intra-lattice scattering. Now I want to calculate the scattering problem for an incident wave with spin polarization in the x-direction.
My question: how to set the incident spin state along the x-direction and calculate the corresponding spin-flipped (spin in -x direction) and spin-conserved scattering probabilities?
Thanks very much!
Best, Wei
--
College of Science, University of Aeronautics and Astronautics, Nanjing, 210016, P. R. China
E-mail: pchenweis@gmail.com,
weichenphy@nuaa.edu.cn
-- College of Science, University of Aeronautics and Astronautics, Nanjing, 210016, P. R. China E-mail: pchenweis@gmail.com <pchenweis@163.com>, weichenphy@nuaa.edu.cn
participants (2)
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Anton Akhmerov -
Wei Chen