Elasticity/Rayleigh-Ritz method: Difference between revisions

The potential energy functional has the form

${\displaystyle \mathrm{\Pi }[𝐮]=\frac{1}{2}\underset{ℬ}{\int }\mathrm{\nabla }𝐮:(\text{C}:\mathrm{\nabla }𝐮)dV-\underset{ℬ}{\int }𝐟\bullet 𝐮dV-\underset{\partial ℬ}{\int }\widehat{𝐭}\bullet 𝐮dV}$

The standard method of finding an approximate solution to the mixed boundary value problem is to minimize ${\displaystyle \mathrm{\Pi }}$ over a restricted class of functions (the Rayleigh-Ritz method), by assuming that

${\displaystyle {𝐮}_{\text{approx}}={𝐰}_0+{\displaystyle \sum _{n=1}^N}{a}_n{𝐰}_n}$

where ${\displaystyle {𝐰}_n}$ are functions that are chosen so that they vanish on ${\displaystyle \partial {ℬ}^u}$ and ${\displaystyle {𝐰}_0}$ is a function that approximates the boundary displacements on ${\displaystyle \partial {ℬ}^u}$. The constants ${\displaystyle a_n}$ are then chosen so that they make ${\displaystyle \mathrm{\Pi }[{𝐮}_{\text{approx}}]}$ a minimum.

Suppose,

${\displaystyle \mathrm{\Pi }[{𝐮}_{\text{approx}}]={\mathrm{\Pi }}_{\text{approx}}=\mathrm{\Pi }[a_1,a_2,,a_n]}$

Then,

${\displaystyle {\mathrm{\Pi }}_{\text{approx}}=A+\frac{1}{2}{\displaystyle \sum _{m,n=1}^N}{B}_{mn}{a}_m{a}_n+{\displaystyle \sum _{n=1}^N}{D}_n{a}_n}$

where,

${\displaystyle \begin{array}{cc}A& =\underset{ℬ}{\int }U({𝐰}_0)dV-\underset{ℬ}{\int }𝐟\bullet {𝐰}_{0}dV-\underset{\partial {ℬ}^t}{\int }\widehat{𝐭}\bullet {𝐰}_{0}dA\\ B_{mn}& =\underset{ℬ}{\int }\mathrm{\nabla }{𝐰}_m:(\text{C}:\mathrm{\nabla }{𝐰}_n)dV\\ D_n& =\underset{ℬ}{\int }\mathrm{\nabla }{𝐰}_0:(\text{C}:\mathrm{\nabla }{𝐰}_n)dV-\underset{ℬ}{\int }𝐟\bullet {𝐰}_{n}dV-\underset{\partial {ℬ}^t}{\int }\widehat{𝐭}\bullet {𝐰}_{n}dA\end{array}}$

To minimize ${\displaystyle {\mathrm{\Pi }}_{\text{approx}}}$ we use the relations

${\displaystyle \frac{\partial \mathrm{\Pi }}{\partial a_i}=0(i=1,2,,n)}$

to get a set of ${\displaystyle N}$ equations which provide us with the values of ${\displaystyle a_i}$.

This is the approach taken for the displacement-based finite element method. If, instead, we choose to start with the complementary energy functional, we arrive at the stress-based finite element method.

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