Elasticity/Minimizing a functional: Difference between revisions

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In 1-D, the minimization problem can be stated as

Find ${\displaystyle u(x)}$ such that

${\displaystyle U[u(x)]={\displaystyle \underset{x_0}{\overset{x_1}{\int }}}F(x,u,u^{\text{'}})dx}$

is a minimum.

We have seen that the minimization problem can be reduced down to the solution of an Euler equation

${\displaystyle \frac{\partial F}{\partial u}-\frac{d}{dx}\left(\frac{\partial F}{\partial u^{\text{'}}}\right)=0}$

with the associated boundary conditions

${\displaystyle \eta (x_0)=0\text{and}\eta (x_1)=0}$

or,

${\displaystyle {\frac{\partial F}{\partial u^{\text{'}}}|}_{x_0}=0\text{and}{\frac{\partial F}{\partial u^{\text{'}}}|}_{x_1}=0}$

In 3-D, the equivalent minimization problem can be stated as

Find ${\displaystyle 𝐮(𝐱)}$ such that

${\displaystyle U[𝐮(𝐱)]=\underset{ℛ}{\int }F(𝐱,𝐮,\mathrm{\nabla }𝐮)dV}$

is a minimum.

We would like to find the Euler equation for this problem and the associated boundary conditions required to minimize ${\displaystyle U}$.

Let us define all our quantities with respect to an orthonormal basis ${\displaystyle ({\widehat{𝐞}}_i)}$.

Then,

${\displaystyle 𝐱=x_i{\widehat{𝐞}}_i;𝐮=u_i{\widehat{𝐞}}_i;\mathrm{\nabla }𝐮=u_{i,j}{\widehat{𝐞}}_i\otimes {\widehat{𝐞}}_j}$

and

${\displaystyle U[𝐮(𝐱)]=\underset{ℛ}{\int }\tilde{F}(x_i,u_i,u_{i,j})dV}$

Taking the first variation of ${\displaystyle U}$, we get

${\displaystyle \delta U=\underset{ℛ}{\int }(\frac{\partial \tilde{F}}{\partial u_i}\delta u_i+\frac{\partial \tilde{F}}{\partial u_{i,j}}\delta u_{i,j})dV}$

All the nine components of ${\displaystyle \delta u_{i,j}}$ are not independent. Why ?

The variation of the functional ${\displaystyle U}$ needs to be expressed entirely in terms of ${\displaystyle \delta u_i}$. We do this using the 3-D equivalent of integration by parts - the divergence theorem.

Thus,

${\displaystyle \begin{array}{cc}\underset{ℛ}{\int }\frac{\partial \tilde{F}}{\partial u_{i,j}}\delta u_{i,j}dV& =\underset{ℛ}{\int }\frac{\partial }{\partial x_j}\left(\frac{\partial \tilde{F}}{\partial u_{i,j}}\delta u_i\right)dV-\underset{ℛ}{\int }\frac{\partial }{\partial x_j}\left(\frac{\partial \tilde{F}}{\partial u_{i,j}}\right)\delta u_{i}dV\\ & =\underset{\partial ℛ}{\int }\frac{\partial \tilde{F}}{\partial u_{i,j}}\delta u_i{n}_{j}dA-\underset{ℛ}{\int }\frac{\partial }{\partial x_j}\left(\frac{\partial \tilde{F}}{\partial u_{i,j}}\right)\delta u_{i}dV\end{array}}$

Substituting in the expression for ${\displaystyle \delta U}$, we have,

${\displaystyle \begin{array}{cc}\delta U& =\underset{ℛ}{\int }\frac{\partial \tilde{F}}{\partial u_i}\delta u_{i}dV+\underset{\partial ℛ}{\int }\frac{\partial \tilde{F}}{\partial u_{i,j}}\delta u_i{n}_{j}dA-\underset{ℛ}{\int }\frac{\partial }{\partial x_j}\left(\frac{\partial \tilde{F}}{\partial u_{i,j}}\right)\delta u_{i}dV\\ & =\underset{ℛ}{\int }[\frac{\partial \tilde{F}}{\partial u_i}-\frac{\partial }{\partial x_j}\left(\frac{\partial \tilde{F}}{\partial u_{i,j}}\right)]\delta u_{i}dV+\underset{\partial ℛ}{\int }\frac{\partial \tilde{F}}{\partial u_{i,j}}\delta u_i{n}_{j}dA\end{array}}$

For ${\displaystyle U}$ to be minimum, a necessary condition is that ${\displaystyle \delta U=0}$ for all variations ${\displaystyle \delta 𝐮}$.

Therefore, the Euler equation for this problem is

${\displaystyle \frac{\partial \tilde{F}}{\partial u_i}-\frac{\partial }{\partial x_j}\left(\frac{\partial \tilde{F}}{\partial u_{i,j}}\right)=0\mathrm{\forall }𝐱\in ℛ}$

and the associated boundary conditions are

${\displaystyle \frac{\partial \tilde{F}}{\partial u_{i,j}}=0\text{or,}\delta u_i=0\mathrm{\forall }𝐱\in \partial ℛ}$

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