User:Arthurv~enwiki/finitelement

In static linear elasticity problems, the problem to be solved is:

${\displaystyle {\vec {F}}=K{\vec {x}}}$

The K matrix is known as the static stiffness matrix, and F and x are the force and displacement vectors respectively.

Several element types can be used to construct the K matrix. In this case, 2-D plane strain problems, triangular elements with linear shape functions were used.

Generally,

${\displaystyle K=\int _{\Omega _{e}}B^{T}DB}$

where ${\displaystyle B=SN}$ where S is a differential operator, and N is the shape function of the element, and ${\displaystyle \Omega _{e}}$ is the area or volume of the element (depending whether it is a 2-D or 3-D problem).

For the linear triangular case, the B matrix is constant, so K is given as:

${\displaystyle K={\frac {t}{4\Delta }}B_{a}^{T}DB_{b}}$

If a=b, then the resulting stiffness is for a node, otherwise, it is for the edge. This paves the way for using the geometry to store the stiffness matrix.

${\displaystyle K_{ii}u_{i}^{k+1}=F_{i}-\sum _{i\neq j}^{N}K_{ij}u_{j}^{k}}$

But to make it stable, the jacobi iterations must be transformed into an iterative-refinement method:

${\displaystyle A_{ii}\Delta U_{i}^{k+1}=R_{i}-\sum _{i\neq j}^{N}A_{ij}\Delta U_{j}^{k}}$