New scaling laws for pinning force density in superconductors

Abstract

Since the report by Fietz and Webb (1968 Phys. Rev. 178 657), who considered the pinning force density, |Fp| = |Jc × B| (where Jc is the critical current density and B is applied magnetic field), in isotropic superconductors as a unique function of the reduced applied field, B/Bc2 (where Bc2 is the upper critical field), |Fp| has been scaled based on B/Bc2 ratio, for which there is widely used scaling law of |Fp(B)|=Fp,max((B/Bc2)p)((1-B/Bc2)q), where Fp,max, Bc2, p, and q are free-fitting parameters, proposed by Kramer (1973 J. Appl. Phys. 44 1360) and Dew-Hughes (1974 Phil. Mag. 30 293). To describe |Fp(B)| in high-temperature superconductors, Kramer-Dew-Hughes scaling law was modified by (a) an assumption of the angular dependence of all free-fitting parameters on the rotation angle and (b) by the replacement of the upper critical field, Bc2, by the irreversibility field, Birr. Here we note that the pinning force density is also a function of critical current density and, thus, |Fp(Jc)| scaling law should exist. In an attempt to reveal this law, we considered the full |Fp(B,Jc)| function and reported that there are three distinctive characteristic ranges of (B/Bc2, Jc/(Jc(sf))) (where Jc(sf) is the self-field critical current density) on which |Fp(B,Jc)| can be splatted. Several new scaling laws for |Fp(Jc)| were proposed, discussed, and applied to scale |Fp(Jc)| in MgB2, NdFeAs(O,F), REBCO, and near-room temperature superconducting super hydrides (La,Y)H10 and YH6. We pointed out that the general scaling law for the pinning force density is on the quest.