Spin transfer torque in continuous textures: semiclassical Boltzmann approach

Abstract

We consider a microscopic model of itinerant electrons coupled via ferromagnetic exchange to a local magnetization whose direction vector n(r,t) varies in space and time. We assume that to first order in the spatial gradient and time derivative of n(r,t) the magnetization distribution function f(p,r,t) of itinerant electrons has the Ansatz form: f(p,r,t)=fparallel(p)n(r,t)+ f1 r(p) n nablar n+f2 r(p) nablar n+ f1 t(p) n partialt n+f2 t(p) partialt n. Using then the Landau-Sillin equations of motion approach we derive explicit forms for the components fparallel(p), f1 r(p), f2 r(p), f1 t(p) and f2 t(p) in "equilibrum" and in out of equilibrum situations for: (i) no scattering by impurities, (ii) spin conserving scattering and (iii) spin non-conserving scattering. The back action on the localized electron magnetization from the out of equilibrum part of the two components f1 r, f2 r constitutes the two spin transfer torque terms.

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