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Symmetry classes in piezoelectricity from second-order symmetries

Marc Olive, Nicolas Auffray

2021Mathematics and Mechanics of Complex Systems16 citationsDOIOpen Access PDF

Abstract

The piezoelectricity law is a constitutive model that describes how mechanical andelectric fields are coupled within a material. In its linear formulation this law comprises threeconstitutive tensors of increasing order: the second order permittivity tensor S, the third orderpiezoelectricity tensor P and the fourth-order elasticity tensor C. In a first part of the paper,the symmetry classes of the piezoelectricity tensor alone are investigated. Using a new approachbased on the use of the so-called clips operations, we establish the 16 symmetry classes of thistensor and provide their associated normal forms. Second order orthogonal transformations(plane symmetries and $\pi$-angle rotations) are then used to characterize and classify directly 11out of the 16 symmetry classes of the piezoelectricity tensor. An additional step to distinguishthe remaining classes is proposed

Topics & Concepts

PiezoelectricityHomogeneous spaceTensor (intrinsic definition)Symmetry (geometry)Elasticity (physics)PhysicsClassical mechanicsTheoretical physicsTensor calculusTensor fieldSymmetric tensorOrder (exchange)Compatibility (geochemistry)Constitutive equationMathematical physicsThird orderMathematicsDeformation (meteorology)Hooke's lawSymmetry groupField (mathematics)Mathematical analysisPermittivityElasticity and Material ModelingNumerical methods in engineeringComposite Material Mechanics
Symmetry classes in piezoelectricity from second-order symmetries | Litcius