Micromechanics of composites/Balance of linear momentum: Difference between revisions

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The balance of linear momentum can be expressed as:

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${\displaystyle \rho \dot{𝐯}-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0}$ 
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where ${\displaystyle \rho (𝐱,t)}$ is the mass density, ${\displaystyle 𝐯(𝐱,t)}$ is the velocity, ${\displaystyle \mathit{\sigma }(𝐱,t)}$ is the Cauchy stress, and ${\displaystyle \rho 𝐛}$ is the body force density.

Recall the general equation for the balance of a physical quantity

${\displaystyle \frac{d}{dt}[\underset{\mathrm{\Omega }}{\int }f(𝐱,t)\text{dV}]=\underset{\partial \mathrm{\Omega }}{\int }f(𝐱,t)[u_n(𝐱,t)-𝐯(𝐱,t)\cdot 𝐧(𝐱,t)]\text{dA}+\underset{\partial \mathrm{\Omega }}{\int }g(𝐱,t)\text{dA}+\underset{\mathrm{\Omega }}{\int }h(𝐱,t)\text{dV}.}$

In this case the physical quantity of interest is the momentum density, i.e., ${\displaystyle f(𝐱,t)=\rho (𝐱,t)𝐯(𝐱,t)}$. The source of momentum flux at the surface is the surface traction, i.e., ${\displaystyle g(𝐱,t)=𝐭}$. The source of momentum inside the body is the body force, i.e., ${\displaystyle h(𝐱,t)=\rho (𝐱,t)𝐛(𝐱,t)}$. Therefore, we have

${\displaystyle \frac{d}{dt}\left[\underset{\mathrm{\Omega }}{\int }\rho 𝐯\text{dV}\right]=\underset{\partial \mathrm{\Omega }}{\int }\rho 𝐯[u_n-𝐯\cdot 𝐧]\text{dA}+\underset{\partial \mathrm{\Omega }}{\int }𝐭\text{dA}+\underset{\mathrm{\Omega }}{\int }\rho 𝐛\text{dV}.}$

The surface tractions are related to the Cauchy stress by

${\displaystyle 𝐭=\mathit{\sigma }\cdot 𝐧.}$

Therefore,

${\displaystyle \frac{d}{dt}\left[\underset{\mathrm{\Omega }}{\int }\rho 𝐯\text{dV}\right]=\underset{\partial \mathrm{\Omega }}{\int }\rho 𝐯[u_n-𝐯\cdot 𝐧]\text{dA}+\underset{\partial \mathrm{\Omega }}{\int }\mathit{\sigma }\cdot 𝐧\text{dA}+\underset{\mathrm{\Omega }}{\int }\rho 𝐛\text{dV}.}$

Let us assume that ${\displaystyle \mathrm{\Omega }}$ is an arbitrary fixed control volume. Then,

${\displaystyle \underset{\mathrm{\Omega }}{\int }\frac{\partial }{\partial t}(\rho 𝐯)\text{dV}=-\underset{\partial \mathrm{\Omega }}{\int }\rho 𝐯(𝐯\cdot 𝐧)\text{dA}+\underset{\partial \mathrm{\Omega }}{\int }\mathit{\sigma }\cdot 𝐧\text{dA}+\underset{\mathrm{\Omega }}{\int }\rho 𝐛\text{dV}.}$

Now, from the definition of the tensor product we have (for all vectors ${\displaystyle 𝐚}$)

${\displaystyle (𝐮\otimes 𝐯)\cdot 𝐚=(𝐚\cdot 𝐯)𝐮.}$

Therefore,

${\displaystyle \underset{\mathrm{\Omega }}{\int }\frac{\partial }{\partial t}(\rho 𝐯)\text{dV}=-\underset{\partial \mathrm{\Omega }}{\int }\rho (𝐯\otimes 𝐯)\cdot 𝐧\text{dA}+\underset{\partial \mathrm{\Omega }}{\int }\mathit{\sigma }\cdot 𝐧\text{dA}+\underset{\mathrm{\Omega }}{\int }\rho 𝐛\text{dV}.}$

Using the divergence theorem

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

we have

${\displaystyle \underset{\mathrm{\Omega }}{\int }\frac{\partial }{\partial t}(\rho 𝐯)\text{dV}=-\underset{\mathrm{\Omega }}{\int }\mathrm{\nabla }\bullet [\rho (𝐯\otimes 𝐯)]\text{dV}+\underset{\mathrm{\Omega }}{\int }\mathrm{\nabla }\bullet \mathit{\sigma }\text{dV}+\underset{\mathrm{\Omega }}{\int }\rho 𝐛\text{dV}}$

or,

${\displaystyle \underset{\mathrm{\Omega }}{\int }[\frac{\partial }{\partial t}(\rho 𝐯)+\mathrm{\nabla }\bullet [(\rho 𝐯)\otimes 𝐯)]-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛]\text{dV}=0.}$

Since ${\displaystyle \mathrm{\Omega }}$ is arbitrary, we have

${\displaystyle \frac{\partial }{\partial t}(\rho 𝐯)+\mathrm{\nabla }\bullet [(\rho 𝐯)\otimes 𝐯)]-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0.}$

Using the identity

${\displaystyle \mathrm{\nabla }\bullet (𝐮\otimes 𝐯)=(\mathrm{\nabla }\bullet 𝐯)𝐮+(\mathrm{\nabla }𝐮)\cdot 𝐯}$

we get

${\displaystyle \frac{\partial \rho }{\partial t}𝐯+\rho \frac{\partial 𝐯}{\partial t}+(\mathrm{\nabla }\bullet 𝐯)(\rho 𝐯)+\mathrm{\nabla }(\rho 𝐯)\cdot 𝐯-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0}$

or,

${\displaystyle [\frac{\partial \rho }{\partial t}+\rho \mathrm{\nabla }\bullet 𝐯]𝐯+\rho \frac{\partial 𝐯}{\partial t}+\mathrm{\nabla }(\rho 𝐯)\cdot 𝐯-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0}$

Using the identity

${\displaystyle \mathrm{\nabla }(\phi 𝐯)=\phi \mathrm{\nabla }𝐯+𝐯\otimes (\mathrm{\nabla }\phi )}$

we get

${\displaystyle [\frac{\partial \rho }{\partial t}+\rho \mathrm{\nabla }\bullet 𝐯]𝐯+\rho \frac{\partial 𝐯}{\partial t}+[\rho \mathrm{\nabla }𝐯+𝐯\otimes (\mathrm{\nabla }\rho )]\cdot 𝐯-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0}$

From the definition

${\displaystyle (𝐮\otimes 𝐯)\cdot 𝐚=(𝐚\cdot 𝐯)𝐮}$

we have

${\displaystyle [𝐯\otimes (\mathrm{\nabla }\rho )]\cdot 𝐯=[𝐯\cdot (\mathrm{\nabla }\rho )]𝐯.}$

Hence,

${\displaystyle [\frac{\partial \rho }{\partial t}+\rho \mathrm{\nabla }\bullet 𝐯]𝐯+\rho \frac{\partial 𝐯}{\partial t}+\rho \mathrm{\nabla }𝐯\cdot 𝐯+[𝐯\cdot (\mathrm{\nabla }\rho )]𝐯-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0}$

or,

${\displaystyle [\frac{\partial \rho }{\partial t}+\mathrm{\nabla }\rho \cdot 𝐯+\rho \mathrm{\nabla }\bullet 𝐯]𝐯+\rho \frac{\partial 𝐯}{\partial t}+\rho \mathrm{\nabla }𝐯\cdot 𝐯-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0.}$

The material time derivative of ${\displaystyle \rho }$ is defined as

${\displaystyle \dot{\rho }=\frac{\partial \rho }{\partial t}+\mathrm{\nabla }\rho \cdot 𝐯.}$

Therefore,

${\displaystyle [\dot{\rho }+\rho \mathrm{\nabla }\bullet 𝐯]𝐯+\rho \frac{\partial 𝐯}{\partial t}+\rho \mathrm{\nabla }𝐯\cdot 𝐯-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0.}$

From the balance of mass, we have

${\displaystyle \dot{\rho }+\rho \mathrm{\nabla }\bullet 𝐯=0.}$

Therefore,

${\displaystyle \rho \frac{\partial 𝐯}{\partial t}+\rho \mathrm{\nabla }𝐯\cdot 𝐯-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0.}$

The material time derivative of ${\displaystyle 𝐯}$ is defined as

${\displaystyle \dot{𝐯}=\frac{\partial 𝐯}{\partial t}+\mathrm{\nabla }𝐯\cdot 𝐯.}$

Hence,

${\displaystyle \rho \dot{𝐯}-\mathrm{\nabla }\bullet \mathit{\sigma }-\rho 𝐛=0.}$

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