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Computation of effective viscoelastic properties and time-dependent constituent properties with Abaqus SwiftComp GUI

Viscoelastic Homogenization with Time-dependent Constituent Properties

In this example, we want to compute the effective properties of a composite material made of isotropic viscoelastic matrix and transversely isotropic elastic fiber. The fiber properties are defined by means of engineering constants as specified in the table below.

Fiber properties defined as transversely isotropic elasticFiber properties defined as transversely isotropic elastic

The matrix properties are given as a time-dependent properties, which means that for each time a value of the Young’s modulus is given. In addition, we will consider that the matrix has a constant Poisson’s ratio equal to 0.37.

We will use a square pack 2D SG with fiber volume fraction equal to vf = 0.64.

Software Used

In his tutorial we will use Abaqus CAE with the Abaqus SwiftComp GUI plug-in. Abaqus CAE will be used to GUI to define the time-dependent material properties and to run the viscoelastic homogenization. SwiftComp will run in the background.

Solution Procedure

The steps required to compute the effective viscoelastic properties using Abaqus SwiftComp GUI are as follows.

# Step 1. We define the material properties in global coordinate system. We click on Materials in Abaqus CAE and define the Fiber properties by means of the engineering constants and click “Ok”.

Definition of the fiber propertiesDefinition of the fiber properties

# Step 2. Within the Materials of Abaqus CAE, we create a dummy material called “Matrix”. Please note that we will not define the Prony coefficients of the resin using the Abaqus SwiftComp GUI in the next step.

Creation of the dummy material for the matrixCreation of the dummy material for the matrix

# Step 3. In the Abaqus SwiftComp GUI menu, we click on Input Time-Dependent Properties. We select “Prony Coefficients” and “Viscoelastic” in the Method & Analysis section. We pick “Matrix” as the Material to be modified in the drop down menu. Then, we input the relaxed Young modulus, Poisson’s ratio and the Prony coefficients following the equation presented above. Finally, we click “Ok”.

Definition of the matrix Prony coefficientsDefinition of the matrix Prony coefficients

# Step 4. From the default the Abaqus SwiftComp GUI SGs, we pick the 2D Structure Genome with Square pack. We input the fiber volume fraction, define the approximate global mesh size, and click “Ok”. A square pack microstructure will be automatically generated.

Definition of the 2D SG square pack microstructureDefinition of the 2D SG square pack microstructure

2D SG square pack microstructure2D SG square pack microstructure

# Step 5. Now, we will compute the effective viscoelastic properties. To do so, we click on Homogenization and select Viscoelastic in Analysis Type. In the Viscoelastic/Thermoviscoelastic Analysis section, we define the range of the time (i.e. Initial time” and Final time”) in which we want to output the effective properties as well as the frequency (i.e. Time increment” defined in decades).

Definition of the viscoelastic homogenization stepDefinition of the viscoelastic homogenization step

# Step 6. We click on Ok to run the homogenization step. SwiftComp on the background will run the homogenization.

SwiftComp running on the backgroundSwiftComp running on the background

# Step 7.The results can be found in the .sc.k file as shown next. Note that the effective properties will be outputted for each specified time.

Results corresponding to the effective viscoelastic propertiesResults corresponding to the effective viscoelastic properties

References

  1. Liu, X.; Tang, T.; Yu, W., Pipes, R. B.: “Multiscale modeling of viscoelastic behavior of textile composites,” International Journal of Engineering Science, Vol 130, September 2018, pp. 175-186, DOI: 10.1016/j.ijengsci.2018.06.003.
  1. Rique, O.; Liu, X.; Yu, W., Pipes, R. B.: “Constitutive modeling for time- and temperature-dependent behavior of composites,” Composites Part B: Engineering, Vol 184, March 2020, DOI: 10.1016/j.compositesb.2019.107726.

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