Elliptic Problems#
Elliptic partial differential equations are used to model steady-state phenomena with no time dependence. Common examples include the Poisson equation and Laplace equation, which describe electrostatic potentials, steady-state heat distribution, and equilibrium fluid flow.
Contents
- 1D Elliptic Problems
- Elliptic1D
- Elliptic1D Add Scalar Boundary Conditions
- Elliptic1D Homogenous Dirichlet Boundary Conditions
- Elliptic1D Left Dirichlet and Right Neumann Boundary Conditions
- Elliptic1D Left Dirichlet and Right Robin Boundary Conditions
- Elliptic1D Pure Neumann Boundary Conditions
- Elliptic1D Left Neumann Right Robin Boundary Conditions
- Elliptic1D Pure Robin Boundary Conditions
- Elliptic1D Non-Homogenous Dirichlet Boundary Conditions
- Elliptic1D Non-Periodic Dirichlet Boundary Conditions
- Elliptic1D Periodic Dirichlet Boundary Conditions
- 2D Elliptic Problems
- 3D Elliptic Problems