This example provides a demonstration of using PyMKS to compute the linear strain field for a two-phase composite material. The example introduces the governing equations of linear elasticity, along with the unique boundary conditions required for the MKS. It subsequently demonstrates how to generate data for delta microstructures and then use this data to calibrate the first order MKS influence coefficients for all strain fields. The calibrated influence coefficients are used to predict the strain response for a random microstructure and the results are compared with those from finite element. Finally, the influence coefficients are scaled up and the MKS results are again compared with the finite element data for a large problem.

PyMKS uses the finite element tool SfePy to generate both the strain fields to fit the MKS model and the verification data to evaluate the MKS model's accuracy.

For the sake of completeness, a description of the equations of linear elasticity is included. The constitutive equation that describes the linear elastic phenomena is Hook's law.

$$ \sigma_{ij} = C_{ijkl}\varepsilon_{kl} $$$\sigma$ is the stress, $\varepsilon$ is the strain, and $C$ is the stiffness tensor that relates the stress to the strain fields. For an isotropic material the stiffness tensor can be represented by lower dimension terms which can relate the stress and the strain as follows.

$$ \sigma_{ij} = \lambda \delta_{ij} \varepsilon_{kk} + 2\mu \varepsilon_{ij} $$$\lambda$ and $\mu$ are the first and second Lame parameters and can be defined in terms of the Young's modulus $E$ and Poisson's ratio $\nu$ in 2D.

$$ \lambda = \frac{E\nu}{(1-\nu)(1-2\nu)} $$$$ \mu = \frac{E}{3(1+\nu)} $$Linear strain is related to displacement using the following equation.

$$ \varepsilon_{ij} = \frac{u_{i,j}+u_{j,i}}{2} $$We can get an equation that relates displacement and stress by plugging the equation above back into our expression for stress.

$$ \sigma_{ij} = \lambda u_{k,k} + \mu( u_{i,j}+u_{j,i}) $$The equilibrium equation for elastostatics is defined as

$$ \sigma_{ij,j} = 0 $$and can be cast in terms of displacement.

$$ \mu u_{i,jj}+(\mu + \lambda)u_{j,ij}=0 $$In this example, a displacement controlled simulation is used to calculate the strain. The domain is a square box of side $L$ which has an macroscopic strain $\bar{\varepsilon}_{xx}$ imposed.

In general, generating the calibration data for the MKS requires boundary conditions that are both periodic and displaced, which are quite unusual boundary conditions and are given by:

$$ u(L, y) = u(0, y) + L\bar{\varepsilon}_{xx}$$$$ u(0, L) = u(0, 0) = 0 $$$$ u(x, 0) = u(x, L) $$The first order MKS influence coefficients are all that is needed to compute a strain field of a random microstructure, as long as the ratio between the elastic moduli (also known as the contrast) is less than 1.5. If this condition is met, we can expect a mean absolute error of 2% or less, when comparing the MKS results with those computed using finite element methods [1].

Because we are using distinct phases and the contrast is low enough to only need the first order coefficients, delta microstructures and their strain fields are all that we need to calibrate the first order influence coefficients [2].

Here we use the `make_delta_microstructure`

function from `pymks.datasets`

to create the two delta microstructures needed to calibrate the first order influence coefficients for a two-phase microstructure. The `make_delta_microstructure`

function uses SfePy to generate the data

```
In [1]:
```import pymks
%matplotlib inline
%load_ext autoreload
%autoreload 2
import numpy as np
import matplotlib.pyplot as plt

```
In [2]:
```n = 21
from pymks.tools import draw_microstructures
from pymks.datasets import make_delta_microstructures
X_delta = make_delta_microstructures(n_phases=2, size=(n, n))
draw_microstructures(X_delta)

```
```

The `make_elasticFEstrain_delta`

function from `pymks.datasets`

provides an easy interface to generate delta microstructures and their strain fields, which can then be used for calibration of the influence coefficients. The function calls the `ElasticFESimulation`

class to compute the strain fields with the boundary conditions given above.

In this example, lets look at a two-phase microstructure with elastic moduli values of 100 and 120 and Poisson's ratio values of 0.3 and 0.3 respectively. Let's also set the macroscopic imposed strain equal to 0.02. All of these parameters used in the simulation must be passed into the `make_elasticFEstrain_delta`

function. Note that `make_elasticFEstrain_delta`

does not take a number of samples argument as the number of samples to calibrate the MKS is fixed by the number of phases.

```
In [3]:
```from pymks.datasets import make_elastic_FE_strain_delta
from pymks.tools import draw_microstructure_strain
elastic_modulus = (100, 120)
poissons_ratio = (0.3, 0.3)
macro_strain = 0.02
size = (n, n)
X_delta, y_delta = make_elastic_FE_strain_delta(elastic_modulus=elastic_modulus,
poissons_ratio=poissons_ratio,
size=size, macro_strain=macro_strain)

Let's take a look at one of the delta microstructures and the $\varepsilon_{xx}$ strain field.

```
In [4]:
```draw_microstructure_strain(X_delta[0], y_delta[0])

```
```

Now that we have the delta microstructures and their strain fields, we can calibrate the influence coefficients by creating an instance of the `MKSLocalizationModel`

class. Because we have 2 phases we will create an instance of MKSLocalizationModel with the number of states `n_states`

equal to 2. Then, pass the delta microstructures and their strain fields to the `fit`

method.

```
In [5]:
```from pymks import MKSLocalizationModel
from pymks import PrimitiveBasis
p_basis = PrimitiveBasis(n_states=2, domain=[0, 1])
model = MKSLocalizationModel(basis=p_basis)

`fit`

method to calibrate the first-order influence coefficients.

```
In [6]:
```model.fit(X_delta, y_delta)

That's it, the influence coefficient have be calibrated. Let's take a look at them.

```
In [7]:
```from pymks.tools import draw_coeff
draw_coeff(model.coef_)

```
```

Let's now use our instance of the `MKSLocalizationModel`

class with calibrated influence coefficients to compute the strain field for a random two phase microstructure and compare it with the results from a finite element simulation.

The `make_elasticFEstrain_random`

function from `pymks.datasets`

is an easy way to generate a random microstructure and its strain field results from finite element analysis.

```
In [8]:
```from pymks.datasets import make_elastic_FE_strain_random
np.random.seed(99)
X, strain = make_elastic_FE_strain_random(n_samples=1, elastic_modulus=elastic_modulus,
poissons_ratio=poissons_ratio, size=size,
macro_strain=macro_strain)
draw_microstructure_strain(X[0] , strain[0])

```
```

**Note that the calibrated influence coefficients can only be used to reproduce the simulation with the same boundary conditions that they were calibrated with.**

Now to get the strain field from the `MKSLocalizationModel`

just pass the same microstructure to the `predict`

method.

```
In [9]:
```strain_pred = model.predict(X)

Finally let's compare the results from finite element simulation and the MKS model.

```
In [10]:
```from pymks.tools import draw_strains_compare
draw_strains_compare(strain[0], strain_pred[0])

```
```

Lastly, let's look at the difference between the two strain fields.

```
In [11]:
```from pymks.tools import draw_differences
draw_differences([strain[0] - strain_pred[0]], ['Finite Element - MKS'])

```
```

The influence coefficients that were calibrated on a smaller microstructure can be used to predict the strain field on a larger microstructure though spectral interpolation [3], but accuracy of the MKS model drops slightly. To demonstrate how this is done, let's generate a new larger random microstructure and its strain field.

```
In [12]:
```m = 3 * n
size = (m, m)
print size
X, strain = make_elastic_FE_strain_random(n_samples=1, elastic_modulus=elastic_modulus,
poissons_ratio=poissons_ratio, size=size,
macro_strain=macro_strain)
draw_microstructure_strain(X[0] , strain[0])

```
```

`resize_coeff`

method.

```
In [13]:
```model.resize_coeff(X[0].shape)

Let's now take a look that ther resized influence coefficients.

```
In [14]:
```draw_coeff(model.coef_)

```
```

`predict`

method to get the strain field.

```
In [15]:
```strain_pred = model.predict(X)
draw_strains_compare(strain[0], strain_pred[0])

```
```

Again, let's look at the difference between the two strain fields.

```
In [16]:
```draw_differences([strain[0] - strain_pred[0]], ['Finite Element - MKS'])

```
```

[1] Binci M., Fullwood D., Kalidindi S.R., A new spectral framework for establishing localization relationships for elastic behavior of composites and their calibration to finite-element models. Acta Materialia, 2008. 56 (10) p. 2272-2282 doi:10.1016/j.actamat.2008.01.017.

[2] Landi, G., S.R. Niezgoda, S.R. Kalidindi, Multi-scale modeling of elastic response of three-dimensional voxel-based microstructure datasets using novel DFT-based knowledge systems. Acta Materialia, 2009. 58 (7): p. 2716-2725 doi:10.1016/j.actamat.2010.01.007.

[3] Marko, K., Kalidindi S.R., Fullwood D., Computationally efficient database and spectral interpolation for fully plastic Taylor-type crystal plasticity calculations of face-centered cubic polycrystals. International Journal of Plasticity 24 (2008) 1264–1276 doi:10.1016/j.ijplas.2007.12.002.

[4] Marko, K. Al-Harbi H. F. , Kalidindi S.R., Crystal plasticity simulations using discrete Fourier transforms. Acta Materialia 57 (2009) 1777–1784 doi:10.1016/j.actamat.2008.12.017.

```
In [ ]:
```