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Marginal pinning of vortices at high temperature

arXiv:cond-mat/0104232 · doi:10.1103/PhysRevB.64.134523

Abstract

We analyze the competition between thermal fluctuations and pinning of vortices in bulk type II superconductors subject to point-like disorder and derive an expression for the temperature dependence of the pinning length L_c(T) which separates different types of single vortex wandering. Given a disorder potential with a basic scale ξand a correlator K_0(u) \sim K_0 (u/xi)^{-β} ln^alpha (u/xi) we determine the dependence of L_c(T) on the correlator range: correlators with β> 2 (short-range) and β<2 (long-range) lead to the known results L_c(T) \sim L_c(0) exp[C T^3] and L_c(T) \sim L_c(0) (C T)^{(4+beta)/(2-beta)}, respectively. Using functional renormalization group we show that for β=2 the result takes the interpolating form L_c(T) \sim L_c(0) exp[C T^{3/(2+alpha)}]. Pinning of vortices in bulk type II superconductors involves a long-range correlator with β=2, α=1 on intermediate scales ξ<u<λ, with ξand λthe coherence length and London penetration depth, hence L_c(T) \sim L_c(0) exp[C T]; at large distances L_c(T) crosses over to the usual short-range behavior.

5 pages, RevTeX, 1 postscript figure inserted