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structural_mechanics.py
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Created
Sat, Nov 16, 13:06
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text/x-python
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Mon, Nov 18, 13:06 (1 d, 21 h)
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rAKA akantu
structural_mechanics.py
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#!/usr/bin/env python
# coding: utf-8
# # Test of Structural Mechanics
# In this example a beam, consisting of two elements, three nodes, is created.
# The left most node is fixed and a force is applied at the right most node.
import
akantu
as
aka
import
numpy
import
matplotlib.pyplot
as
plt
import
numpy
as
np
# ### Creating the Mesh
# Create a mesh for the two dimensional case
beam
=
aka
.
Mesh
(
2
)
# We now create the connectivity array for the beam.
beam
.
addConnectivity
(
aka
.
_bernoulli_beam_2
)
# We need a `MeshAccessor` in order to change the size of the mesh entities.
beamAcc
=
aka
.
MeshAccessor
(
beam
)
# Now we create the array to store the nodes and the connectivities and give them their size.
beamAcc
.
resizeConnectivity
(
2
,
aka
.
_bernoulli_beam_2
)
beamAcc
.
resizeNodes
(
3
)
Nodes
=
beam
.
getNodes
()
Nodes
[
0
,
:]
=
[
0.
,
0.
]
Nodes
[
1
,
:]
=
[
1.
,
0.
]
Nodes
[
2
,
:]
=
[
2.
,
0.
]
# #### Setting the Connections
Conn
=
beam
.
getConnectivity
(
aka
.
_bernoulli_beam_2
)
Conn
[
0
,
:]
=
[
0
,
1
]
Conn
[
1
,
:]
=
[
1
,
2
]
# #### Ready
# We have to make the mesh ready.
beamAcc
.
makeReady
()
# ### Creating the Model
model
=
aka
.
StructuralMechanicsModel
(
beam
)
# #### Setting up the Modell
# ##### Creating and Inserting the Materials
mat1
=
aka
.
StructuralMaterial
()
mat1
.
E
=
1e9
mat1
.
rho
=
1.
mat1
.
I
=
1.
mat1
.
Iz
=
1.
mat1
.
Iy
=
1.
mat1
.
A
=
1.
mat1
.
GJ
=
1.
model
.
addMaterial
(
mat1
)
mat2
=
aka
.
StructuralMaterial
()
mat2
.
E
=
1e9
mat2
.
rho
=
1.
mat2
.
I
=
1.
mat2
.
Iz
=
1.
mat2
.
Iy
=
1.
mat2
.
A
=
1.
mat2
.
GJ
=
1.
model
.
addMaterial
(
mat2
)
# ##### Initializing the Model
model
.
initFull
(
aka
.
_implicit_dynamic
)
# ##### Assigning the Materials
materials
=
model
.
getElementMaterial
(
aka
.
_bernoulli_beam_2
)
materials
[
0
][
0
]
=
0
materials
[
1
][
0
]
=
1
# ##### Setting Boundaries
# Neumann
# Apply a force of `10` at the last (right most) node.
forces
=
model
.
getExternalForce
()
forces
[:]
=
0
forces
[
2
,
0
]
=
100.
# Dirichlets
# Block all dofs of the first node, since it is fixed.
# All other nodes have no restrictions
boundary
=
model
.
getBlockedDOFs
()
boundary
[
0
,
:]
=
True
boundary
[
1
,
:]
=
False
boundary
[
2
,
:]
=
False
# ### Solving the System
# Set up the system
deltaT
=
1e-10
model
.
setTimeStep
(
deltaT
)
solver
=
model
.
getNonLinearSolver
()
solver
.
set
(
"max_iterations"
,
100
)
solver
.
set
(
"threshold"
,
1e-8
)
solver
.
set
(
"convergence_type"
,
aka
.
SolveConvergenceCriteria
.
solution
)
# Perform N time steps.
# At each step records the displacement of all three nodes in x direction.
N
=
1000000
disp1
=
np
.
zeros
(
N
)
disp2
=
np
.
zeros
(
N
)
disp0
=
np
.
zeros
(
N
)
times
=
np
.
zeros
(
N
)
for
i
in
range
(
N
):
model
.
solveStep
()
disp
=
model
.
getDisplacement
()
disp0
[
i
]
=
disp
[
0
,
0
]
disp1
[
i
]
=
disp
[
1
,
0
]
disp2
[
i
]
=
disp
[
2
,
0
]
times
[
i
]
=
deltaT
*
i
disps
=
[
disp0
,
disp1
,
disp2
]
maxMin
=
[
-
1.0
,
1.0
]
for
d
in
disps
:
maxMin
[
0
]
=
max
(
np
.
max
(
d
),
maxMin
[
0
])
maxMin
[
1
]
=
min
(
np
.
min
(
d
),
maxMin
[
1
])
plt
.
plot
(
disp1
,
times
,
color
=
'g'
,
label
=
"middle node"
)
plt
.
plot
(
disp2
,
times
,
color
=
'b'
,
label
=
"right node"
)
plt
.
title
(
"Displacement in $x$ of the nodes"
)
plt
.
ylabel
(
"Time [S]"
)
plt
.
xlabel
(
"displacement [m]"
)
plt
.
xlim
((
maxMin
[
1
]
*
1.3
,
maxMin
[
0
]
*
1.1
))
plt
.
legend
()
plt
.
show
()
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