sin(2 phi) current-phase relation in SFS junctions with decoherence in the ferromagnet
摘要
We propose a theoretical description of the sin(2 phi) current-phase relation in SFS junctions at the 0- cross-over obtained in recent experiments by Sellier et al. [Phys. Rev. Lett. 92, 257005 (2004)] where it was suggested that a strong decoherence in the magnetic alloy can explain the magnitude of the residual supercurrent at the 0-pi cross-over. To describe the interplay between decoherence and elastic scattering in the ferromagnet we use an analogy with crossed Andreev reflection in the presence of disorder. The supercurrent as a function of the length R of the ferromagnet decays exponentially over a length xi, larger than the elastic scattering length in the absence of decoherence, and smaller than the coherence length in the absence of elastic scattering on impurities. The best fit leads to , where is exchange length of the diffusive system without decoherence (also equal to in the absence of decoherence). The fit of experiments works well for the amplitude of both the sin(phi) and sin(2 phi) harmonics.
引用
@article{arxiv.cond-mat/0406275,
title = {sin(2 phi) current-phase relation in SFS junctions with decoherence in the ferromagnet},
author = {R. Mélin},
journal= {arXiv preprint arXiv:cond-mat/0406275},
year = {2007}
}
备注
7 pages, 3 figures, article rewritten