Universal relations in nonlinear electro-magneto-elasticity

The purpose of this article is to develop a class of universal relations for an incompressible isotropic electro-magneto-elastic (hereafter EME) material in order to generalize the continuum concept to electro-magneto-elasticity. In line with that, we adopt an electro-magneto-elasticity theory follo...

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Bibliographic Details
Published in:Archive of applied mechanics (1991) 2020-07, Vol.90 (7), p.1643-1657
Main Authors: Kumar, Deepak, Sarangi, Somnath, Bhattacharyya, Ranjan
Format: Article
Language:English
Subjects:
Classical Mechanics
Computational fluid dynamics
Deformation
Elasticity
Electromagnetic fields
Electromagnetism
Engineering
Isotropic material
Magnetoelectroelasticity
Original
Tensors
Theoretical and Applied Mechanics
Thermodynamics
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Summary:The purpose of this article is to develop a class of universal relations for an incompressible isotropic electro-magneto-elastic (hereafter EME) material in order to generalize the continuum concept to electro-magneto-elasticity. In line with that, we adopt an electro-magneto-elasticity theory following the second law of thermodynamics-based approach. More precisely, we first extend a thermodynamically consistent deformation of a continua to a coupled EME interaction through a new amended energy function (hereafter AEF). This AEF succeeds the physical insight of the Maxwell stress tensor (hereafter MST) under large deformations. Next, we introduce a new inequality Tb - bT ≠ 0 for a class of an EME material parallel to an equation Tb - bT = 0 for a class of an elastic material existing in the literature. At last, the formulated universal relations are applied to some homogeneous and non-homogeneous deformations to exemplify the consequences of an electromagnetic field on the mechanical deformation. Additionally, the validity of the proposed universal relations in electro-magneto-elasticity is also checked by obtaining an existing universal relation in nonlinear elasticity in the absence of an applied electromagnetic field.
ISSN:0939-1533
1432-0681
DOI:10.1007/s00419-020-01688-1