Tensor representation of magnetostriction for all crystal classes
From MaRDI portal
Publication:5132375
DOI10.1177/1081286518810741OpenAlexW2903969553WikidataQ128732936 ScholiaQ128732936MaRDI QIDQ5132375
No author found.
Publication date: 12 November 2020
Published in: Mathematics and Mechanics of Solids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1177/1081286518810741
Related Items (3)
On the statics and dynamics of transverse domain walls in bilayer piezoelectric-magnetostrictive nanostructures ⋮ Domain wall dynamics in cubic magnetostrictive materials subject to Rashba effect and nonlinear dissipation ⋮ Strain-mediated propagation of magnetic domain-walls in cubic magnetostrictive materials
Cites Work
- Unnamed Item
- A geometrically consistent incremental variational formulation for phase field models in micromagnetics
- Lagrangian formulation of the linear autonomous magnetization dynamics in spin-torque auto-oscillators
- Equilibrium theory for magnetic elastomers and magnetoelastic membranes
- Reversible magneto-elastic behavior: a multiscale approach
- Computational inelasticity
- Conewise linear elastic materials
- Inertial and self interactions in structured continua: Liquid crystals and magnetostrictive solids
- Green-Naghdi rate of the Kirchhoff stress and deformation rate: the elasticity tensor
- On the continuum theory of deformable ferromagnetic solids
- Onset of linear instability driven by electric currents in magnetic systems: a Lagrangian approach
- Integrity bases for a symmetric tensor and a vector. The crystal classes
- Adaptive techniques for Landau-Lifshitz-Gilbert equation with magnetostriction
- A transversely isotropic composite with a statistical distribution of spheroidal inclusions: a geometrical approach to overall properties
- Global weak solutions for the Landau-Lifschitz equation with magnetostriction
- The anisotropic tensors
- The linear elasticity tensor of incompressible materials
- Fourth-rank tensors of the thirty-two crystal classes: multiplication tables
- Nonlinear magnetoelastic deformations
- Derivation of Magnetostriction and Anisotropic Energies for Hexagonal, Tetragonal, and Orthorhombic Crystals
- Isotropic integrity bases for vectors and second-order tensors
This page was built for publication: Tensor representation of magnetostriction for all crystal classes
