40 research outputs found
Nonlocality in mesoscopic Josephson junctions with strip geometry
We study the current in a clean superconductor-normal-metal-superconductor
junction of length d and width w in the presence of an applied magnetic field
H. We show that both the geometrical pattern of the current density and the
critical current as a function of the total flux in the junction, depend on the
ratio of the Josephson vortex distance a_0 and the range r of the nonlocal
electrodynamics. In particular, the critical current has the periodicity of the
superconducting flux quantum only for r<a_0 and acquires, due to boundary
effects, the double (pseudo-) periodicity for strong nonlocality, r>a_0.
Comparing our results to recent experiments of Heida et al. [Phys. Rev. B 57,
R5618 (1998)] we find good agreement.Comment: 4 pages, 5 figures, to be published in the RC section of Phys. Rev.