Delocalization of Flux Lines from Extended Defects by Bulk Randomness
arXiv:cond-mat/9303015 · doi:10.1209/0295-5075/23/7/007
Abstract
We study the delocalization by bulk randomness of a single flux line (FL) from an extended defect, such as a columnar pin or twin plane. In three dimensions, the FL is always bound to a planar defect, while there is an unpinning transition from a columnar pin. Transfer matrix simulations confirm this picture, and indicate that the divergence of the localization length from the columnar defect is governed by a liberation exponent $ν_\perp =1.3 \pm 0.6$, for which a ``mean-field'' estimate gives $ν_\perp \approx 0.78$. The results, and their extensions, are compared to other theories. The effects may be observable in thin samples close to $H_{c1}$.
5 pages, 3 figures available upon request,REVTeX 3.0