Magnetostriction describes the change in dimensions of a material due to a change in its magnetization. This phenomenon is a manifestation of magnetoelastic coupling, which is exhibited by all magnetic materials to some extent. The effects related to magnetoelastic coupling are described by various names. The Joule effect describes the change in length due to a change in the magnetization state of the material. This magnetostrictive effect is used in transducers for applications in sonars, acoustic devices, active vibration control, position control, and fuel injection systems.

The inverse effect accounts for the change in magnetization due to mechanical stress in the material. This effect is also known Villari effect. This effect is mostly useful in sensors.

Magnetostriction has a quantum-mechanical origin. The magneto-mechanical coupling takes place at the atomic level due to spin-orbit coupling. From a system level, the material can be assumed to consist of a number of tiny ellipsoidal magnets which rotate due to the torque produced by the externally applied magnetic field. The rotation of these elemental magnets produces a dimensional change leading to free strain in the material.

It is possible to express the relation between the stress S, strain ε, magnetic field H, and magnetic flux density B in either a stress-magnetization form or strain-magnetization form:

You find all the necessary material data inputs within the Magnetostrictive Material node under the Solid Mechanics interface, which are added automatically when you add a predefined Magnetostriction multiphysics interface. Such a node can be also added manually under any Solid Mechanics interface similar to all other material model features. The Magnetostrictive Material uses Voigt notation for the anisotropic material data. More details about the data ordering can be found in Orthotropic and Anisotropic Materials section.

The following material data corresponds to Terfenol-D at 100 kA/m bias and 30 MPa prestress (Ref. 5):

A commonly accepted micromagnetic description of the magnetostriction is as follows (Ref. 2):

where . Note that the magnetostrictive strain is represented by a deviatoric tensor, i.e. . This is because the deformation is related to the magnetic domain rotation, and such process should not change the material volume.

Using Equation 3-45, one gets

For an isotropic material, , and Equation 3-45 becomes

For a polycrystalline material without preferred orientation, the following approximation can be used (Ref. 1):

The strain field is deviatoric, and Equation 3-47 exhibits the same properties as Equation 3-45 at saturation, i.e. when . Equation 3-46 is replaced by

where is a perturbation, and

Nonlinear magnetization in the magnetostrictive material is found from the following nonlinear implicit relation (Ref. 4):

where L is the Langevin function

with being the magnetic susceptibility in the initial linear region.

Other possible choices of the L function are a hyperbolic tangent

where H is the applied magnetic field. The second term in Equation 3-49 represents the mechanical stress contribution to the effective magnetic field, and thus to the material magnetization, which is called the Villari effect. The deviatoric stress tensor is related to the strain as

In addition, the magnetization and magnetic field are related to each other and to the magnetic flux density (also called the B-field) by

COMSOL Multiphysics solves for the magnetic vector potential A whose curl yields the vector B-field. The H-field is then obtained as a function of the B-field and magnetization.