Current and current density distribution in parallel superconducting wires in a planar array in the meissner state

In a system of parallel superconducting wires, which are connected at their ends, any two conductors form a closed superconducting loop, in which, according to the law of induction, no variation of the enclosed magnetic flux can occur. If a transverse magnetic field is applied to the system, the clo

For the current distribution inside a multifilamentary superconducting wire carring a dc transport current in a rapidly changing transverse magnetic field, inconsistencies with the existing models are shown by the following experimental evidence: when a transverse magnetic field is applied, the dist

The current-density distribution produced inside irregularly shaped, homogeneous human and rat models by low-frequency electric fields is obtained by a two-stage finite-difference procedure. In the first stage the model is assumed to be equipotential. Laplace's equation is solved by iteration in the