Kang T. et al. (2019) : Communications in Applied Mathematics and Computational Science

  • 邓钰宏
  • 创建时间: 2020-02-07

Tittle: Petrophysical Field Formulation based on Decomposition of the Electric Field for a Nonlinear Induction Hardening Model

Abstract: In this paper we investigate a mathematical model of induction heating including eddy current equations coupled with a nonlinear heat equation. A nonlinear law between the magnetic field and the magnetic induction field in the workpiece is assumed. Meanwhile the electric conductivity is temperature dependent. We present a potential field formulation (the A-φ method) based on decomposition of the electric field for the electromagnetic part. Using the theory of monotone operator and Rothe’s method, we prove the existence of a weak solution to the coupled nonlinear system in the conducting domain. Finally, we solve it by means of the A-φ finite element method and show some numerical simulation results.

Citation: Kang T., Wang R., Zhang H., (2019). Petrophysical field formulation based on decomposition of the electric field for a nonlinear induction hardening model. Communications in Applied Mathematics and Computational Science, 14, 175-205.