Spin Accumulation in Diffusive Conductors with Rashba and Dresselhaus Spin-Orbit Interaction

Abstract

We calculate the electrically induced spin accumulation in diffusive systems due to both Rashba (with strength α) and Dresselhaus (with strength β) spin-orbit interaction. Using a diffusion equation approach we find that magnetoelectric effects disappear and that there is thus no spin accumulation when both interactions have the same strength, α= β. In thermodynamically large systems, the finite spin accumulation predicted by Chaplik, Entin and Magarill, [Physica E 13, 744 (2002)] and by Trushin and Schliemann [Phys. Rev. B 75, 155323 (2007)] is recovered an infinitesimally small distance away from the singular point α= β. We show however that the singularity is broadened and that the suppression of spin accumulation becomes physically relevant (i) in finite-sized systems of size L, (ii) in the presence of a cubic Dresselhaus interaction of strength γ, or (iii) for finite frequency measurements. We obtain the parametric range over which the magnetoelectric effect is suppressed in these three instances as (i) |α|-|β| 1/mL, (ii)|α|-|β| γ p F2, and (iii) |α|-|β| ω/m p F with the elastic mean free path and p F the Fermi momentum. We attribute the absence of spin accumulation close to α= β to the underlying U (1) symmetry. We illustrate and confirm our predictions numerically.