Stress-Strain Curves

This vignette demonstrates generation of averaged stress-strain curves from data from several coupons. The same procedure can be used to generate bearing load-deformation curves and other similar curves.

There are two functions provided by the cmstatrExt package for doing this. The function average_curve_lm() uses stats::lm() behind the scenes to fit a curve defined by a formula to the data. The function average_curve_optim() uses numeric optimization to fit a curve defined by a user-specified function to the data. Use the former function for fitting polynomials, use the latter for fitting exponential models or models with discontinuities. Both will be discussed in more detail in this vignette.

Setup

In this example, the following packages need to be loaded:

knitr::opts_chunk$set(message = FALSE, warning = FALSE)
library(cmstatrExt)
library(tidyverse)

Example Data

The cmstatrExt package comes with some example stress-strain data. The first few rows of this data are:

head(pa12_tension)
#> # A tibble: 6 × 3
#>   Coupon     Strain Stress
#>   <chr>       <dbl>  <dbl>
#> 1 Coupon 4 0        0.0561
#> 2 Coupon 4 0.000200 0.247 
#> 3 Coupon 4 0.000400 0.569 
#> 4 Coupon 4 0.000601 0.440 
#> 5 Coupon 4 0.000801 0.778 
#> 6 Coupon 4 0.00100  0.854

This data is in “tidy” format. This means that each data-point (stress-strain value) is in a row of the data.frame. This example data set contains stress-strain data from four coupons (Samples 1 through 4). Each row identifies the coupon that the observation comes from. While the order of the columns does not matter and you can give each column any name you wish, the data will need to be in this type of format.

Let’s plot the pa12_tension example data.

pa12_tension %>%
  ggplot(aes(x = Strain, y = Stress, color = Coupon)) +
  geom_point()

Fitting a Polynomial Model

For the first example, we’ll fit the following quadratic model:

\[ \sigma = c_1 \epsilon + c_2 \epsilon^2 \] where \(\sigma\) is the stress, \(\epsilon\) is the strain and \(c_1\) and \(c_2\) are constants that we’ll find. We need to write this as an R formula, which has slightly different notation. The stress and strain variables in our data are Stress and Strain, respectively, so we’ll use those variable names in the formula.

Stress ~ I(Strain) + I(Strain^2) + 0

Notice that in this formula, a tilde (~) is used instead of an equal sign. You’ll also notice that we’ve wrapped the terms on the right-hand side inside the identity function I(): the reason for this is that lm will treat Strain^2 as an interaction, rather than squaring the value of Strain, while I(Strain^2) will actually square the value of Strain. The formula doesn’t need coefficients (e.g. \(c_1\) and \(c_2\)). Finally, notice that we’ve included the term +0, which tells lm that we want the intercept to be zero, which will normally be desirable due to the physical notion that stress ought to be zero at zero strain.

The function average_curve_lm takes four arguments. The first is a data.frame with the data. The second is the name of the variable defining the coupon. The third is the formula that we just discussed. The last argument is the number of “bins”: this has a default of 100 and hence can be omitted. See the documentation for this function for information about binning the data.

Let’s run this function and then execute the summary method on the result:

curve_quadratic <- average_curve_lm(
  pa12_tension, Coupon,
  Stress ~ I(Strain) + I(Strain^2) + 0
)
summary(curve_quadratic)
#> 
#> Range: ` Strain ` in  [0,  0.1409409 ]
#> n_bins =  100
#> 
#> Call:
#> average_curve_lm(data = pa12_tension, coupon_var = Coupon, model = Stress ~ 
#>     I(Strain) + I(Strain^2) + 0)
#> 
#> Residuals:
#>     Min      1Q  Median      3Q     Max 
#> -2.3812 -1.1354  0.0107  1.4057  4.2013 
#> 
#> Coefficients:
#>              Estimate Std. Error t value Pr(>|t|)    
#> I(Strain)    1010.585      4.016   251.6   <2e-16 ***
#> I(Strain^2) -4913.506     36.786  -133.6   <2e-16 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#> 
#> Residual standard error: 1.626 on 398 degrees of freedom
#> Multiple R-squared:  0.9985, Adjusted R-squared:  0.9984 
#> F-statistic: 1.286e+05 on 2 and 398 DF,  p-value: < 2.2e-16

The summary method shows the strain range over which the curve was fit. This range always starts at zero and ends at the lowest maximum strain of any individual coupon. The summary method also lists the coefficients as well as information about whether each term is statistically significant, the residuals and R-squared values.

Next, let’s plot the original data and the curve fit. We’ll use the augment method to add the curve fit to the original data, then pass the result to ggplot.

curve_quadratic %>%
  augment() %>%
  ggplot(aes(x = Strain)) +
  geom_point(aes(y = Stress, color = Coupon)) +
  geom_line(aes(y = .fit))

Due to the polynomial model that we chose (quadratic), this curve fit is poor. We can do better. Let’s try a cubic function next.

curve_cubic <- average_curve_lm(
  pa12_tension, Coupon,
  Stress ~ I(Strain) + I(Strain^2) + I(Strain^3) + 0
)
summary(curve_cubic)
#> 
#> Range: ` Strain ` in  [0,  0.1409409 ]
#> n_bins =  100
#> 
#> Call:
#> average_curve_lm(data = pa12_tension, coupon_var = Coupon, model = Stress ~ 
#>     I(Strain) + I(Strain^2) + I(Strain^3) + 0)
#> 
#> Residuals:
#>     Min      1Q  Median      3Q     Max 
#> -2.3080 -0.4003 -0.1726  0.3103  2.2058 
#> 
#> Coefficients:
#>              Estimate Std. Error t value Pr(>|t|)    
#> I(Strain)    1173.285      4.662  251.69   <2e-16 ***
#> I(Strain^2) -8761.916    102.493  -85.49   <2e-16 ***
#> I(Strain^3) 20480.874    537.832   38.08   <2e-16 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#> 
#> Residual standard error: 0.7546 on 397 degrees of freedom
#> Multiple R-squared:  0.9997, Adjusted R-squared:  0.9997 
#> F-statistic: 3.985e+05 on 3 and 397 DF,  p-value: < 2.2e-16
curve_cubic %>%
  augment() %>%
  ggplot(aes(x = Strain)) +
  geom_point(aes(y = Stress, color = Coupon)) +
  geom_line(aes(y = .fit))

This cubic model is a much better fit. The equation for this curve fit is:

\[ \sigma = 1174 \, \epsilon - 8783 \, \epsilon^2 + 20586 \, \epsilon^3 \]

Strain does not need to be the independent variable and stress does not need to be the dependent variable. We could fit a model with these reversed.

average_curve_lm(
  pa12_tension, Coupon,
  Strain ~ I(Stress) + I(Stress^2) + I(Stress^3) + I(Stress^4) + 0
) %>%
  augment() %>%
  ggplot(aes(y = Stress)) +
  geom_point(aes(x = Strain, color = Coupon)) +
  geom_line(aes(x = .fit))

In this case, the fit is not very good, so it’s not of much practical use. However, note that the curve fit ends at the lowest maximum stress value of any individual coupon this time. The curve fit will always end at the lowest maximum value of the independent variable (the variable on the right hand side of the formula).

Fitting a Bilinear Model

Next, we turn our attention to fitting a model that cannot be represented by an R formula. We’ll fit the following model:

\[ \sigma = \left\{ \begin{matrix} c_1 \epsilon & \text{if }\epsilon \le \epsilon_1 \\ c_2 \left(\epsilon - \epsilon_1\right) + c_1\epsilon_1 & \text{otherwise} \end{matrix} \right. \]

This model will thus be a straight line starting from the origin extending to an unknown value of strain (\(\epsilon_1\)), then continuing with a different slope. In order to use this model with average_curve_optim, we need to write this as an R function where the first argument is the independent variable (strain in our case) and the second argument is a vector of parameters. In this case, there are three parameters, \(c_1\), \(c_2\) and \(\epsilon_1\).

bilinear_fn <- function(strain, par) {
  c1 <- par[1]
  c2 <- par[2]
  e1 <- par[3]
  if (strain <= e1) {
    return(c1 * strain)
  } else {
    return(c2 * (strain - e1) + c1 * e1)
  }
}

The function average_curve_optim takes nine arguments:

We’ll call this function:

curve_bilinear <- average_curve_optim(
  pa12_tension,
  Coupon, Strain, Stress,
  bilinear_fn,
  c(1, 1, 0.04) # the initial guess
)
curve_bilinear
#> 
#> Range: ` Strain ` in  [ 0,  0.1409409 ]
#> 
#> Call:
#> average_curve_optim(data = pa12_tension, coupon_var = Coupon, 
#>     x_var = Strain, y_var = Stress, fn = bilinear_fn, par = c(1, 
#>         1, 0.04))
#> 
#> Parameters:
#> [1] 265.6498522 316.1356934  -0.3258095

The value of the third parameter, \(\epsilon_1\) is well outside the range we’d expect. We’d expect that the “knee” to be somewhere in the range of 0.025-0.100. We can specify upper and lower bounds on the parameters as follows:

curve_bilinear <- average_curve_optim(
  pa12_tension,
  Coupon, Strain, Stress,
  bilinear_fn,
  c(1, 1, 0.04),
  lower = c(0, 0, 0.025),
  upper = c(2000, 2000, 0.100)
)
curve_bilinear
#> 
#> Range: ` Strain ` in  [ 0,  0.1409409 ]
#> 
#> Call:
#> average_curve_optim(data = pa12_tension, coupon_var = Coupon, 
#>     x_var = Strain, y_var = Stress, fn = bilinear_fn, par = c(1, 
#>         1, 0.04), lower = c(0, 0, 0.025), upper = c(2000, 2000, 
#>         0.1))
#> 
#> Parameters:
#> [1] 873.46774319  79.60813130   0.05093549

We can now plot the curve fit over laid with the original data.

curve_bilinear %>%
  augment() %>%
  ggplot(aes(x = Strain)) +
  geom_point(aes(y = Stress, color = Coupon)) +
  geom_line(aes(y = .fit))

Preprocessing Data

The example data in the pa12_tension data set is fairly well behaved and does not need pre-processing. However, most data that you will actually deal with will require pre-processing.

The fff_shear data set that comes with the cmstatrExt package is more typical data that does require pre-processing. Let’s start by plotting this data.

fff_shear %>%
  ggplot(aes(x = Strain, y = Stress, color = Specimen)) +
  geom_point()

There are three aspects of this data that we’ll deal with:

None of these adjustments are done using the functionality of cmstatrExt, but this example is included anyways as these types of adjustments are typically a pre-requisite of curve fitting using cmstatrExt.

We’ll start by removing the offset from the data. To do this, we’ll fit a straight line to the data from each coupon over a stress range of 1000 to 3000 psi, find the x-intercept of this line and subtract this x-intercept from the strain value. This is a bit complicated, so we’ll do it in a few steps before combining everything. We’ll start by filtering the data so that the stress values are in the range 1000 to 3000, grouping by Specimen and finding the x-intercept for each. This code will use the nest(), mutate() map() pattern.

fff_shear %>%
  filter(Stress > 1000 & Stress < 3000) %>%
  group_by(Specimen) %>%
  nest() %>%
  mutate(lm = map(data, ~lm(Strain ~ Stress, data = .))) %>%
  mutate(x_intercept = map(lm, ~predict(.x, data.frame(Stress = 0)))) %>%
  select(-c(lm, data)) %>%
  unnest(x_intercept)
#> # A tibble: 3 × 2
#> # Groups:   Specimen [3]
#>   Specimen x_intercept
#>   <chr>          <dbl>
#> 1 A          -0.000163
#> 2 B          -0.000117
#> 3 C          -0.000432

Now we’ll use inner_join() to join the x_intercept column to the original data (matching the appropriate Specimen). We’ll use head() to just show the first 6 rows for brevity.

fff_shear %>%
  filter(Stress > 1000 & Stress < 3000) %>%
  group_by(Specimen) %>%
  nest() %>%
  mutate(lm = map(data, ~lm(Strain ~ Stress, data = .))) %>%
  mutate(x_intercept = map(lm, ~predict(.x, data.frame(Stress = 0)))) %>%
  select(-c(lm, data)) %>%
  unnest(x_intercept) %>%
  inner_join(fff_shear, by = "Specimen") %>%
  head(6)
#> # A tibble: 6 × 4
#> # Groups:   Specimen [1]
#>   Specimen x_intercept Stress   Strain
#>   <chr>          <dbl>  <dbl>    <dbl>
#> 1 A          -0.000163   230. 0       
#> 2 A          -0.000163   241. 0.000273
#> 3 A          -0.000163   240. 0.000426
#> 4 A          -0.000163   245. 0.000536
#> 5 A          -0.000163   246. 0.000597
#> 6 A          -0.000163   264. 0.000834

Finally, we’ll subtract the x-intercept from the strain for each coupon to obtain the corrected data (and delete the unneeded x_intercept column).

fff_shear_offset <- fff_shear %>%
  filter(Stress > 1000 & Stress < 3000) %>%
  group_by(Specimen) %>%
  nest() %>%
  mutate(lm = map(data, ~lm(Strain ~ Stress, data = .))) %>%
  mutate(x_intercept = map(lm, ~predict(.x, data.frame(Stress = 0)))) %>%
  select(-c(lm, data)) %>%
  unnest(x_intercept) %>%
  inner_join(fff_shear, by = "Specimen") %>%
  mutate(Strain = Strain - x_intercept) %>%
  select(-c(x_intercept))

We’ll plot this now.

fff_shear_offset %>%
  ggplot(aes(x = Strain, y = Stress, color = Specimen)) +
  geom_point()

There are many approaches to removing the post-failure behavior. The specific approach that should be used will depend on the data and test method. In some cases, you might choose to simply manually delete some rows from the data file. However, if you’re processing more data, you may want to truncate the data using some code. Here, we’ll approach the removal of the post-failure behavior by finding the data that has a local slope that is sufficiently negative. We’ll do this by finding the secant over 5 points and checking if this value is more negative than a certain threshold. First, let’s plot the data and color it by a logical value indicating whether we’ll remove the point. This will help find an appropriate threshold using iteration for how negative a slope should cause a point to be removed.

fff_shear_offset %>%
  group_by(Specimen) %>%
  mutate(Lead_Stress = lead(Stress, 5),
         Lead_Strain = lead(Strain, 5),
         Slope = (Lead_Stress - Stress) / (Lead_Strain - Strain),
         Remove = Slope < -1e5 | is.na(Slope)) %>%
  ggplot(aes(x = Strain, y = Stress, shape = Specimen, color = Remove)) +
  geom_point()

The criteria above seems to cut the data off at about the correct point, but after the initial cutoff, some subsequent data would be incorrectly retained. In order to avoid this, we’ll add another criteria that for each curve, as soon as a single data point is removed, all subsequent data points will also be removed.

fff_shear_offset %>%
  group_by(Specimen) %>%
  mutate(Lead_Stress = lead(Stress, 5),
         Lead_Strain = lead(Strain, 5),
         Slope = (Lead_Stress - Stress) / (Lead_Strain - Strain),
         Remove = Slope < -1e5 | is.na(Slope),
         Remove = cumsum(Remove) > 0) %>%
  ggplot(aes(x = Strain, y = Stress, shape = Specimen, color = Remove)) +
  geom_point()

We’ll save this result to a new variable, remove the groupings, filter out the points that we intend to remove and drop the unneeded temporary variables.

fff_shear_truncated <- fff_shear_offset %>%
  group_by(Specimen) %>%
  mutate(Lead_Stress = lead(Stress, 5),
         Lead_Strain = lead(Strain, 5),
         Slope = (Lead_Stress - Stress) / (Lead_Strain - Strain),
         Remove = Slope < -1e5 | is.na(Slope),
         Remove = cumsum(Remove) > 0) %>%
  ungroup() %>%
  filter(!Remove) %>%
  select(Specimen, Stress, Strain)

Next, we’ll remove the “toe” of each curve. The “toe” extends to a stress of somewhat less than 1000 psi, so we’ll remove the “toe” by simply removing all the data with a stress less than 1000 psi.

fff_shear_truncated_no_toe <- fff_shear_truncated %>%
  filter(Stress > 1000)

Now, let’s plot this pre-processed data.

fff_shear_truncated_no_toe %>%
  ggplot(aes(x = Strain, y = Stress, color = Specimen)) +
  geom_point() +
  xlim(c(0, NA)) +
  ylim(c(0, NA))

Now, let’s try fitting an averaged curve to this data.

curve_fff_shear <- fff_shear_truncated_no_toe %>%
  average_curve_lm(
    Specimen,
    Stress ~ I(Strain) + I(Strain^2) + I(Strain^3) + 0
  )
curve_fff_shear
#> 
#> Range: ` Strain ` in  [ 0,  0.112092 ]
#> 
#> Call:
#> average_curve_lm(data = ., coupon_var = Specimen, model = Stress ~ 
#>     I(Strain) + I(Strain^2) + I(Strain^3) + 0)
#> 
#> Coefficients:
#>   I(Strain)  I(Strain^2)  I(Strain^3)  
#>      129670      -312398     -2060929

And we’ll plot this curve fit overlaid on the data with only the strain offset corrected (leaving the “toe” and the post-failure behavior intact).

curve_fff_shear %>%
  augment(fff_shear) %>%
  ggplot(aes(x = Strain)) +
  geom_point(aes(y = Stress, color = Specimen)) +
  geom_line(aes(y = .fit))

Plots for Publication

The last part of this vignette will focus on creating plots for publication in reports. We’ll focus on the following items as examples. It will be up to you how you want to customize your plots for your particular publication.

The cmstatrExt package does not come with any data sets with multiple environmental conditions. We’ll “fake it” for illustration purposes by scaling the pa12_tension stress by 50% and strain by 125% to generate data for the “Fake ETA” environmental condition. We’ll create a new data frame by stacking the original pa12_tension data frame and a version of the pa12_tension data frame with the stress scaled. Before stacking these data frames, we’ll add a new column for condition.

pa12_tension_conditions <-
  bind_rows(
    pa12_tension %>%
      mutate(Condition = "RTA"),
    pa12_tension %>%
      mutate(Condition = "Fake ETA",
             Stress = 0.50 * Stress,
             Strain = 1.25 * Strain)
  )

We already have a cubic model for the original pa12_tension data, but that model was missing the Condition column, so we’ll fit it again.

curve_cubic_rta <- pa12_tension_conditions %>%
  filter(Condition == "RTA") %>%
  average_curve_lm(
    Coupon,
    Stress ~ I(Strain) + I(Strain^2) + I(Strain^3) + 0
  )
curve_cubic_rta
#> 
#> Range: ` Strain ` in  [ 0,  0.1409409 ]
#> 
#> Call:
#> average_curve_lm(data = ., coupon_var = Coupon, model = Stress ~ 
#>     I(Strain) + I(Strain^2) + I(Strain^3) + 0)
#> 
#> Coefficients:
#>   I(Strain)  I(Strain^2)  I(Strain^3)  
#>        1173        -8762        20481

We’ll do the same for the “Fake ETA” data.

curve_cubic_fake_eta <- pa12_tension_conditions %>%
  filter(Condition == "Fake ETA") %>%
  average_curve_lm(
    Coupon,
    Stress ~ I(Strain) + I(Strain^2) + I(Strain^3) + 0
  )
curve_cubic_fake_eta
#> 
#> Range: ` Strain ` in  [ 0,  0.1761762 ]
#> 
#> Call:
#> average_curve_lm(data = ., coupon_var = Coupon, model = Stress ~ 
#>     I(Strain) + I(Strain^2) + I(Strain^3) + 0)
#> 
#> Coefficients:
#>   I(Strain)  I(Strain^2)  I(Strain^3)  
#>       469.3      -2803.8       5243.1

Now, we can plot the two curves.

bind_rows(
  augment(curve_cubic_rta),
  augment(curve_cubic_fake_eta)
) %>%
  ggplot(aes(x = Strain, y = .fit, color = Condition)) +
  geom_line()

In some cases, you’d also want to show the raw data, which can be done as follows. Note that we needed to set the group aestetic in the call to geom_line().

bind_rows(
  augment(curve_cubic_rta),
  augment(curve_cubic_fake_eta)
) %>%
  group_by(Condition) %>%
  ggplot(aes(x = Strain)) +
  geom_point(aes(y = Stress, color = Condition)) +
  geom_line(aes(y = .fit, group = Condition))

Next, we’ll add a secondary y-axis. Since the primary y-axis is in units of MPa, the secondary y-axis will be in units of ksi. To do this, we’ll use a call to scale_y_continuous()

bind_rows(
  augment(curve_cubic_rta),
  augment(curve_cubic_fake_eta)
) %>%
  ggplot(aes(x = Strain, y = .fit, color = Condition)) +
  geom_line() +
  scale_y_continuous(
    "Stress [MPa]",
    sec.axis = sec_axis(~ . * 0.1450377377, name = "Stress [ksi]")
  )

And it’s likely that you’d want to change the theme of the plot using, for example, theme_bw() or your own custom theme.

bind_rows(
  augment(curve_cubic_rta),
  augment(curve_cubic_fake_eta)
) %>%
  ggplot(aes(x = Strain, y = .fit, color = Condition)) +
  geom_line() +
  scale_y_continuous(
    "Stress [MPa]",
    sec.axis = sec_axis(~ . * 0.1450377377, name = "Stress [ksi]")
  ) +
  theme_bw()