Efficient solvers for nonlinear time-periodic eddy current problems

Maxwell's curl equations for a conducting region are simulated by the impedance network. A set of simultaneous first-order ordinary differential equations is developed for the network which can be used to solve linear or nonlinear, transient or static eddy current problems. The resulting set of equa

## Abstract We study a nonlinear degenerate partial differential equation strongly motivated by the modelling of processes in type‐II superconductors in a bounded domain along with appropriate boundary conditions. We design a robust and efficient linear approximation scheme based on fix‐point princ

## Abstract In this paper, we consider some Lorenz‐gauged vector potential formulations of the eddy‐current problem for the time‐harmonic Maxwell equations with material properties having only __L__^∞^‐regularity. We prove that there exists a unique solution of these problems, and we show the conve

In this paper, existence criteria of positive solutions to a class of nonlinear first-order periodic boundary value problems of impulsive dynamic equations on time scales are obtained. The main tool used in this paper is the well-known Guo-Krasnoselskii fixed-point theorem.