rAKA/examples/c++/solid_mechanics_model/implicit571699bcd9afbugfixes/64-building…
rAKA/examples/c++/solid_mechanics_model/implicit
571699bcd9afbugfixes/64-building…
README.rst
README.rst
implicit (2D)
'''''''''''''
:Sources:
.. collapse:: implicit_dynamic.cc (click to expand)
.. literalinclude:: examples/c++/solid_mechanics_model/implicit/implicit_dynamic.cc
:language: c++
:lines: 20-
.. collapse:: material_dynamic.dat (click to expand)
.. literalinclude:: examples/c++/solid_mechanics_model/implicit/material_dynamic.dat
:language: text
:Location:
``examples/c++/solid_mechanics_model/`` `implicit <https://gitlab.com/akantu/akantu/-/blob/master/examples/c++/solid_mechanics_model/implicit>`_
In ``implicit``, an example of a dynamic solution with an implicit time integration is shown.
The implicit scheme is selected using the ``_implicit_dynamic`` constant::
model.initFull(_analysis_method = _implicit_dynamic);
This example consists of
a 3D beam of
:math:`10\mathrm{m}\times1\mathrm{m}\times1\mathrm{m}` blocked
on one side and is on a roller on the other side. A constant force of
:math:`5\mathrm{kN}` is applied in its middle.
:numref:`fig-ex-implicit-dynamic` presents the geometry of this case. The
material used is a fictitious linear elastic material with a density of
:math:`1000 \mathrm{kg/m}^3`, a Young's Modulus of
:math:`120 \mathrm{MPa}` and Poisson's ratio of :math:`0.3`. These values
were chosen to simplify the analytical solution.
An approximation of the dynamic response of the middle point of the
beam is given by:
.. math::
u\left(\frac{L}{2}, t\right)
\approxeq \frac{1}{\pi^4} \left(1 - cos\left(\pi^2 t\right) +
\frac{1}{81}\left(1 - cos\left(3^2 \pi^2 t\right)\right) +
\frac{1}{625}\left(1 - cos\left(5^2 \pi^2 t\right)\right)\right)
.. _fig-ex-implicit-dynamic:
.. figure:: examples/c++/solid_mechanics_model/implicit/images/implicit_dynamic.svg
:align: center
:width: 75%
Numerical setup.
..
\begin{figure}[!htb]
\centering
\includegraphics[scale=.6]{figures/implicit_dynamic}
\caption{Numerical setup}
\label{fig-smm-implicit:dynamic}
\end{figure}
:numref:`fig-ex-implicit-dynamic_solution` presents the deformed
beam at 3 different times during the simulation: time steps 0, 1000 and
2000.
.. _fig-ex-implicit-dynamic_solution:
.. figure:: examples/c++/solid_mechanics_model/implicit/images/dynamic_analysis.png
:align: center
:width: 50%
Deformed beam at three different times (displacement :math:`\times
10`).
'''''''''''''
:Sources:
.. collapse:: implicit_dynamic.cc (click to expand)
.. literalinclude:: examples/c++/solid_mechanics_model/implicit/implicit_dynamic.cc
:language: c++
:lines: 20-
.. collapse:: material_dynamic.dat (click to expand)
.. literalinclude:: examples/c++/solid_mechanics_model/implicit/material_dynamic.dat
:language: text
:Location:
``examples/c++/solid_mechanics_model/`` `implicit <https://gitlab.com/akantu/akantu/-/blob/master/examples/c++/solid_mechanics_model/implicit>`_
In ``implicit``, an example of a dynamic solution with an implicit time integration is shown.
The implicit scheme is selected using the ``_implicit_dynamic`` constant::
model.initFull(_analysis_method = _implicit_dynamic);
This example consists of
a 3D beam of
:math:`10\mathrm{m}\times1\mathrm{m}\times1\mathrm{m}` blocked
on one side and is on a roller on the other side. A constant force of
:math:`5\mathrm{kN}` is applied in its middle.
:numref:`fig-ex-implicit-dynamic` presents the geometry of this case. The
material used is a fictitious linear elastic material with a density of
:math:`1000 \mathrm{kg/m}^3`, a Young's Modulus of
:math:`120 \mathrm{MPa}` and Poisson's ratio of :math:`0.3`. These values
were chosen to simplify the analytical solution.
An approximation of the dynamic response of the middle point of the
beam is given by:
.. math::
u\left(\frac{L}{2}, t\right)
\approxeq \frac{1}{\pi^4} \left(1 - cos\left(\pi^2 t\right) +
\frac{1}{81}\left(1 - cos\left(3^2 \pi^2 t\right)\right) +
\frac{1}{625}\left(1 - cos\left(5^2 \pi^2 t\right)\right)\right)
.. _fig-ex-implicit-dynamic:
.. figure:: examples/c++/solid_mechanics_model/implicit/images/implicit_dynamic.svg
:align: center
:width: 75%
Numerical setup.
..
\begin{figure}[!htb]
\centering
\includegraphics[scale=.6]{figures/implicit_dynamic}
\caption{Numerical setup}
\label{fig-smm-implicit:dynamic}
\end{figure}
:numref:`fig-ex-implicit-dynamic_solution` presents the deformed
beam at 3 different times during the simulation: time steps 0, 1000 and
2000.
.. _fig-ex-implicit-dynamic_solution:
.. figure:: examples/c++/solid_mechanics_model/implicit/images/dynamic_analysis.png
:align: center
:width: 50%
Deformed beam at three different times (displacement :math:`\times
10`).
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