# Quantitative theory of transport in vortex matter of type-II superconductors in the presence of random pinning

@inproceedings{Rosenstein2007QuantitativeTO,
title={Quantitative theory of transport in vortex matter of type-II superconductors in the presence of random pinning},
year={2007}
}
We quantitatively describe the competition between interactions, thermal fluctuations, and random quenched disorder using the dynamical Martin-Siggia-Rose approach [Phys. Rev. A 8, 423 (1973)] to the Ginzburg-Landau model of the vortex matter. The approach first used by Dorsey et al. [Phys. Rev. B 45, 523 (1992)] to describe the linear response far from ${H}_{c1}$ is generalized to include both pinning and finite voltage. It allows one to calculate the non-Ohmic $I\text{\ensuremath{-}}V$ curve… CONTINUE READING

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