Dear All,
I am trying to reproduce the results of some spin texture calculations
on topological insulators in the literature, specifically the work of Basak et
al in PRB84, 121401 (2011). They calculated the spin texture (the helical
nature) of the in-plane spin components in
Dear All,
I am trying to reproduce the results of some spin texture calculations
on topological insulators in the literature, specifically the work of Basak et
al in PRB84, 121401 (2011) on Bi2T3. They calculated the spin texture (the
helical nature) of the in-plane spin components in
Dear All,
I am trying to reproduce the results of some spin texture calculations
on topological insulators in the literature, specifically the work of Basak et
al in PRB84, 121401 (2011). They calculated the spin texture (the helical
nature) of the in-plane spin components in
Dear All,
I am trying to reproduce the results of some spin texture calculations
on topological insulators in the literature, specifically the work of Basak et
al in PRB84, 121401 (2011). They calculated the spin texture (the helical
nature) of the in-plane spin components in
Dear All,
I am trying to reproduce the results of some spin texture calculations
on topological insulators in the literature, specifically the work of Basak et
al in PRB84, 121401 (2011). They calculated the spin texture (the helical
nature) of the in-plane spin components in
at
zeus.theochem.tuwien.ac.at]quot; im Auftrag von quot;Ruben Weht [ruweht at
cnea.gov.ar]
Gesendet: Dienstag, 4. Oktober 2011 19:33
Bis: A Mailing list for WIEN2k users
Betreff: Re: [Wien] spin texture?
Dear Gerhard,
Thanks a lot for your answer.
I think you are absolutely right about
my
at zeus.theochem.tuwien.ac.at]quot; im Auftrag von quot;Ruben
Weht [ruweht at cnea.gov.ar]
Gesendet: Freitag, 30. September 2011 23:49
Bis: A Mailing list for WIEN2k users
Betreff: Re: [Wien] spin texture?
Dear Yundi,
Thanks for your reply.
Well, really I do not know, that is part of
my doubts
The spin texture
] spin texture?
Dear Yundi,
Thanks for your reply.
Well, really I do not know, that is part of
my doubts
The spin texture is in reciprocal space.
How can I manage that in real space?
Ruben
Since the spin of the system changes like a spiral. The magnetic
moment is
non-collinear
Dear Wien users,
I am trying to reproduce some papers regarding the
electronic structure of topological insulators
and system with an important Rashba interaction
(for instance BiTeI, Bi2Se3, etc).
On many of them people calculate the electronic band
structure (on a slab for a topological
Since the spin of the system changes like a spiral. The magnetic moment is
non-collinear. The quantization axis changes. So it is necessary to do a
non-collinear calculation.
Yundi
On Fri, Sep 30, 2011 at 1:24 PM, Ruben Weht ruweht at cnea.gov.ar wrote:
Dear Wien users,
I am trying to
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