Micromechanics of composites/Proof 5: Difference between revisions

Let ${\displaystyle \mathrm{\Omega }}$ be a body and let ${\displaystyle \partial \mathrm{\Omega }}$ be its surface. Let ${\displaystyle 𝐧}$ be the normal to the surface. Let ${\displaystyle 𝐯}$ be a vector field on ${\displaystyle \mathrm{\Omega }}$. Show that

${\displaystyle \underset{\mathrm{\Omega }}{\int }\mathrm{\nabla }𝐯\text{dV}=\underset{\partial \mathrm{\Omega }}{\int }𝐯\otimes 𝐧\text{dA}.}$

Proof:

Recall that

${\displaystyle \underset{\partial \mathrm{\Omega }}{\int }𝐯\otimes ({𝑺}^T\cdot 𝐧)\text{dA}=\underset{\mathrm{\Omega }}{\int }[\mathrm{\nabla }𝐯\cdot 𝑺+𝐯\otimes (\mathrm{\nabla }\bullet {𝑺}^T)]\text{dV}}$

where ${\displaystyle 𝑺}$ is any second-order tensor field on ${\displaystyle \mathrm{\Omega }}$. Let us assume that ${\displaystyle 𝑺=1}$. Then we have

${\displaystyle \underset{\partial \mathrm{\Omega }}{\int }𝐯\otimes (1\cdot 𝐧)\text{dA}=\underset{\mathrm{\Omega }}{\int }[\mathrm{\nabla }𝐯\cdot 1+𝐯\otimes (\mathrm{\nabla }\bullet 1)]\text{dV}}$

Now,

${\displaystyle 1\cdot 𝐧=𝐧;\mathrm{\nabla }\bullet 1=\mathrm{𝟎};𝑨\cdot 1=𝑨}$

where ${\displaystyle 𝑨}$ is any second-order tensor. Therefore,

${\displaystyle \underset{\partial \mathrm{\Omega }}{\int }𝐯\otimes 𝐧\text{dA}=\underset{\mathrm{\Omega }}{\int }\mathrm{\nabla }𝐯\text{dV}.}$

Rearranging,

${\displaystyle \underset{\mathrm{\Omega }}{\int }\mathrm{\nabla }𝐯\text{dV}=\underset{\partial \mathrm{\Omega }}{\int }𝐯\otimes 𝐧\text{dA}◻}$

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