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10 votes

Electromagnetic Eigenvalue problem in FEM yielding spurious solutions

You are correct, this formulation does introduce a spurious space. It's not actually due to any function space/discretization choice, but rather that change of variables step ($\mathbf e_t = k_z \...
rchilton1980's user avatar
  • 5,046
2 votes

Jacobian of 2D element in 3D domain

I think the most general and elegant approach is to use a pseudo-inverse. The Jacobian, in general, is of size $n \times m$, where $n$ is the physical dimension of the domain/mesh, and $n$ is the ...
dlmpal's user avatar
  • 31
1 vote

Jacobian of 2D element in 3D domain

The Jacobian in 2D and 3D is respectively defined as $$J^e=\begin{bmatrix} \dfrac{\partial x}{\partial\xi}&\dfrac{\partial y}{\partial\xi}\\ \dfrac{\partial x}{\partial\eta}&\dfrac{...
Konstantinos's user avatar
2 votes

L2 bounds for fem local basis functions

The inequality at the top is known as an "inverse inequality". Basically, it says that if you squeeze a shape function from the reference cell into a cell of size $h$ (relative to the ...
Wolfgang Bangerth's user avatar
1 vote

Finite element accuracy on non-affine quadrilateral meshes

Case of quad meshes Let us take exact solution to be $\psi = 1 + x + y + xy$. Then $\psi$ satisfies $$ a(\psi,\phi) = 0, \qquad \forall \phi \in H^1_0 $$ with $\psi$ taking prescribed boundary values. ...
cfdlab's user avatar
  • 3,038
3 votes

Shape functions on the triangle using vertex values and derivatives

For a quadratic polynomial in 2D you need $1$ coefficient for the constant term, $2$ coefficients for the linear term, and $3$ for the quadratic terms, for a total of $6$ coefficients. For a cubic you ...
lightxbulb's user avatar
  • 2,352
4 votes
Accepted

Finite element accuracy on non-affine quadrilateral meshes

This is too long to be a comment, so I will leave it here as an answer. There are two issues here preventing $\psi_h$ to be exactly equal to $\psi$. The first issue has to do with the nature of the (...
Tulip's user avatar
  • 176

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