Acoustic pressure distribution.
Acoustic pressure distribution in 3D.
Biot problem - deformable porous medium.
Biot problem - deformable porous medium with the no-penetration boundary condition on :math:`\Gamma_{walls}` boundary region.
Laplace equation (eg: temperature distribution) on a cube geometry with different boundary condition values on the cube sides.
Example explaining how to change Dirichlet boundary conditions depending on time.
Diffusion (Laplace-like) equation with non-isotropic diffusion coefficient :math:`K`.
Laplace equation with comments.
Stationary Laplace equation.
Poisson equation with source term.
This example is using a mesh generated by gmsh.
Laplace equation.
Laplace equation with Dirichlet boundary conditions given by a sine function and constants.
Transient Laplace equation in time interval :math:`t \in [0, t_{\rm final}]` with non-constant initial condition given by a function.
Nearly incompressible hyperelastic material model with active fibres.
Nearly incompressible Mooney-Rivlin hyperelastic material model.
Compressible Mooney-Rivlin hyperelastic material model.
Porous nearly incompressible hyperelastic material with fluid perfusion.
Elastic contact planes simulating an indentation test.
Diametrically point loaded 2-D disk.
Diametrically point loaded 2-D disk with postprocessing.
Diametrically point loaded 2-D disk with nodal stress calculation.
Diametrically point loaded 2-D disk with postprocessing and probes.
Linear elasticity with comments.
Time-dependent linear elasticity with a simple damping.
This example shows how to use the post_process_hook and probe_hook options.
Linear elasticity with pressure traction load on surface :math:`\Gamma_{right}` and constrained to one-dimensional motion.
Nearly incompressible linear elasticity in mixed displacement-pressure formulation with comments.
Linear viscoelasticity with pressure traction load on surface :math:`\Gamma_{right}` and constrained to one-dimensional motion.
Example demonstrating how a linear elastic term can be used to solve an elasticity problem with a material nonlinearity.
Linear elasticity with given prestress in :math:`\Omega_1` and (pre)strain fibre reinforcement in :math:`\Omega_2`.
Navier-Stokes equations for incompressible fluid flow.
Stabilized Navier-Stokes problem with grad-div, SUPG and PSPG stabilization solved by a custom Oseen solver, see [1].
Stokes equations for incompressible fluid flow.
Piezo-elasticity problem - linear elastic material with piezoelectric effects.
Thermo-elasticity with a given temperature distribution.
