Material Laws and Numerical Methods in Applied Superconductivity [article]

H. S. Ruiz
2012 arXiv   pre-print
Contents Preface I Electromagnetism of type II superconductors 1 General Statements Of The Critical State 1.1 The CS In The Maxwell Equations Formalism 1.2 The CS Regime And The MQS Limit 2 Variational Theory for CS Problems 2.1 General Principles Of The Variational Method 2.2 The Material Law: SCs with magnetic anisotropy 2.2.1 Onto the 1D Critical States 2.2.2 Towards The 3D Critical States 3 Computational Method Conclusions I References I II Critical State Problems:Effects & Applications 4
more » ... pe-II SCs With Intrinsic Magnetic Anisotropy 4.1 3D variational statement in slab geometry 4.2 Isotropic predictions in -3D- configurations 4.3 T-states in -3D- configurations 4.4 CT-states in -3D- configurations 4.5 Smooth critical states in -3D- configurations Appendix I Critical angle gradient in -3D- configurations 5 The Longitudinal Transport Problem 5.1 Simplified analytical models and beyond 5.1.1 The simplest analytical model 5.1.2 The SDCST statement and the BM's approach 5.2 Magnetic anisotropy and the uncommon effects 5.2.1 Extremal case: The T-states model 5.2.2 Material laws with magnetic anisotropy: CTχ - models 6 Electromagnetism For Superconducting Wires 6.1 Theoretical framework and general considerations 6.2 SC wires subjected to isolated external sources 6.2.1 Wires with an injected AC transport current 6.2.2 Wires under an external AC magnetic flux 6.2.3 Ultimate considerations on the AC losses 6.3 SC wires under simultaneous AC excitations (B_0,I_tr) 6.3.1 Synchronous excitations 6.3.2 Asynchronous excitations Conclusions II References II Supplementary Material II III Microscopical aspects also analyzed 7 E-Ph Theory And The Nodal Kink Effect In HTSC 8 Is it necessary to go beyond the E-Ph mode? Conclusions III References III Supplementary Material III IV Addenda
arXiv:1203.2159v1 fatcat:3yvywwtdqfbqthke75ameztn6e