期刊
APPLIED MATHEMATICAL MODELLING
卷 118, 期 -, 页码 236-252出版社
ELSEVIER SCIENCE INC
DOI: 10.1016/j.apm.2023.01.036
关键词
Soft ferromagnetic material; Rigid inclusion; K -M potentials; Laurent polynomial
This study investigated the behavior of a rigid inclusion embedded in a soft ferromagnetic material in two-dimensional space under uniform magnetic load at infinity, considering the magnetic insulation boundary of the rigid inclusion. Analytical solutions for the magnetic and stress fields were obtained using linear magnetoelastic theory and complex variable theory. The results revealed that the displacement, magnetic flux, and stress distribution of the rigid inclusions are significantly influenced by their shape and contour curvature.
The analytical investigations on a rigid inclusion embedded in a soft ferromagnetic ma-terial in two-dimensional space subjected to uniform magnetic load at infinity have been carried out, with the magnetic insulation boundary of the rigid inclusion. In our study, explicit solutions of the magnetic and stress fields are obtained based on linear magne-toelastic theory and complex variable theory. The relative rigid-body displacement of the rigid inclusion is considered to ensure the boundary condition and constraint satisfied ac-curately. It is found that the analytic solutions of Kolosov-Muskhelishvili (K-M) potentials have a compact form when the shape of rigid inclusion is characterized by Laurent polyno-mial with finite terms. As examples, the rigid-body displacement, magnetic flux and stress on the boundary of elliptic and polygonal rigid inclusions are analyzed, respectively. Our results show that the rigid-body displacement caused by a non-strong magnetic load is small, while the orientation and contour curvature of the rigid inclusions have significant effects on the distribution of the stress and magnetic flux fields. In addition, the maxi-mum magnetic flux and maximum stress do not always occur at the maximum curvature point. For polygonal rigid inclusions, the orientations in which the extreme concentration is obtained are closely related to the number of tips of the inclusions. (c) 2023 Published by Elsevier Inc.
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