2008
DOI: 10.1063/1.2917351
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Flux-line cutting in rotating type-II superconductors in parallel geometry

Abstract: Experimental results of a type-II superconductor, undergoing slow oscillations in a static magnetic field, have been theoretically investigated. The theoretical description considers the occurrence of flux-line cutting since the critical currents have a parallel component to the magnetic induction B. For this purpose, the elliptic flux-line-cutting critical-state model has been employed to calculate the magnitude B and orientation α(x) of the magnetic induction. Hysteresis loops, at different initial magnetic … Show more

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Cited by 8 publications
(5 citation statements)
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“…Therefore, in general, none of the principal axes lies on the magnetic induction vector B. The latter result differs from the ECSM, where the curve traced by J in the - J J plane is an ellipse whose major axis  J c always coincides with the direction of B [21][22][23].…”
Section: Construction Of the Bianisotropic-critical-state Modelmentioning
confidence: 71%
See 1 more Smart Citation
“…Therefore, in general, none of the principal axes lies on the magnetic induction vector B. The latter result differs from the ECSM, where the curve traced by J in the - J J plane is an ellipse whose major axis  J c always coincides with the direction of B [21][22][23].…”
Section: Construction Of the Bianisotropic-critical-state Modelmentioning
confidence: 71%
“…The ECSM, introduced by Romero-Salazar and Pérez-Rodríguez, is valid for isotropic superconductors under rotating or crossed magnetic fields [20][21][22][23]. They postulated a constitutive equation J E ( ) similar to those used for anisotropic materials, see equation (2), except that the diagonal tensor J c ˆhad the principal values J c⊥ and J cP .…”
Section: Introductionmentioning
confidence: 99%
“…In addition, the minimization is performed with the local distribution of currents constrained by the law J ∈ r . Notice that either material or extrinsic anisotropy can be easily incorporated by prescribing r to be the appropriate region: for instance, by modeling r as an elliptical [4,[18][19][20]22] or a rectangular [4][5][6][7][8][9][10][11][12]30] region oriented over selected axes. Mathematically, such kinds of regions are hosted as limiting cases of a smooth expression defined by the two-parameter family of superelliptic functions:…”
Section: Variational Statementmentioning
confidence: 99%
“…Notice that, either material or extrinsic anisotropy can be easily incorporated by prescribing ∆ r to be the appropriate region. For instance, by modeling ∆ r as an elliptical [4,[18][19][20]22] or a rectangular [4][5][6][7][8][9][10][11][12]30] region oriented over selected axes.…”
Section: Variational Statementmentioning
confidence: 99%
“…Furthermore, as it is shown in Refs. [19,27], the elliptic critical-state model successfully describes the magnetic response of superconducting disks undergoing oscillations in a magnetic field of fixed magnitude for nonmagnetic, paramagnetic, and diamagnetic initial states [11].…”
Section: Introductionmentioning
confidence: 99%