semhelpinghands

Introduction

As of now, semhelpinghands has four groups of functions: manipulating parameter estimates tables, comparing results from different methods, bootstrapping, and … others.

This article will only introduce very briefly the groups. Some of them will be introduced in details in forthcoming article dedicated to them.

Let’s load the package first, and also load lavaan.

library(semhelpinghands)
library(lavaan)
#> This is lavaan 0.6-12
#> lavaan is FREE software! Please report any bugs.

Manipulate Parameter Estimates Tables

In using lavaan, I prefer reading the output of parameterEstimates(), which is compact and clear to me. I sometimes would like to organize the rows and columns in ways meaningful to a particular research questions. This can certainly be done using base R or dplyr. However, I am lazy and want to be able to do things using just one or two functions, with just one or two arguments.

This is a sample dataset for illustration, dvs_ivs, with 3 predictors (x1, x2, and x3), 3 outcome variables (y1 y2, and y3), and a group variable (gp).

First a single sample model:

data(dvs_ivs)
mod <-
"
y1 ~ x1 + x2 + x3
y2 ~ x1 + x3
y3 ~ y2 + x2
"
fit <- sem(model = mod, data = dvs_ivs,
           fixed.x = FALSE)

The parameter estimates tables:

est <- parameterEstimates(fit)
est
#>    lhs op rhs    est    se      z pvalue ci.lower ci.upper
#> 1   y1  ~  x1  0.206 0.087  2.354  0.019    0.034    0.377
#> 2   y1  ~  x2  0.381 0.093  4.100  0.000    0.199    0.563
#> 3   y1  ~  x3  0.162 0.088  1.852  0.064   -0.009    0.334
#> 4   y2  ~  x1  0.149 0.105  1.425  0.154   -0.056    0.354
#> 5   y2  ~  x3  0.230 0.105  2.187  0.029    0.024    0.437
#> 6   y3  ~  y2  0.044 0.106  0.420  0.675   -0.163    0.251
#> 7   y3  ~  x2  0.295 0.121  2.445  0.014    0.059    0.532
#> 8   y1 ~~  y1  0.695 0.098  7.071  0.000    0.502    0.888
#> 9   y2 ~~  y2  1.013 0.143  7.071  0.000    0.732    1.294
#> 10  y3 ~~  y3  1.206 0.171  7.071  0.000    0.872    1.540
#> 11  y1 ~~  y3 -0.027 0.092 -0.292  0.770   -0.206    0.153
#> 12  x1 ~~  x1  0.926 0.131  7.071  0.000    0.669    1.183
#> 13  x1 ~~  x2  0.118 0.088  1.339  0.180   -0.055    0.291
#> 14  x1 ~~  x3  0.000 0.092 -0.001  0.999   -0.180    0.180
#> 15  x2 ~~  x2  0.828 0.117  7.071  0.000    0.598    1.057
#> 16  x2 ~~  x3  0.073 0.087  0.840  0.401   -0.098    0.244
#> 17  x3 ~~  x3  0.912 0.129  7.071  0.000    0.659    1.165

A two-sample model is also fitted to the dataset:

fit_gp <- sem(model = mod, data = dvs_ivs,
              group = "gp",
              fixed.x = FALSE)

This is the parameter estimates table:

est_gp <- parameterEstimates(fit_gp)
est_gp
#>    lhs op rhs block group    est    se      z pvalue ci.lower ci.upper
#> 1   y1  ~  x1     1     1  0.210 0.149  1.404  0.160   -0.083    0.502
#> 2   y1  ~  x2     1     1  0.243 0.138  1.761  0.078   -0.027    0.513
#> 3   y1  ~  x3     1     1  0.246 0.144  1.710  0.087   -0.036    0.527
#> 4   y2  ~  x1     1     1  0.036 0.179  0.199  0.842   -0.315    0.386
#> 5   y2  ~  x3     1     1  0.217 0.176  1.232  0.218   -0.128    0.561
#> 6   y3  ~  y2     1     1  0.096 0.120  0.802  0.423   -0.139    0.332
#> 7   y3  ~  x2     1     1  0.372 0.135  2.754  0.006    0.107    0.637
#> 8   y1 ~~  y1     1     1  0.754 0.157  4.796  0.000    0.446    1.062
#> 9   y2 ~~  y2     1     1  1.148 0.239  4.796  0.000    0.679    1.617
#> 10  y3 ~~  y3     1     1  0.787 0.164  4.796  0.000    0.466    1.109
#> 11  y1 ~~  y3     1     1  0.010 0.114  0.085  0.932   -0.213    0.232
#> 12  x1 ~~  x1     1     1  0.798 0.166  4.796  0.000    0.472    1.125
#> 13  x1 ~~  x2     1     1  0.223 0.132  1.694  0.090   -0.035    0.481
#> 14  x1 ~~  x3     1     1  0.121 0.121  1.001  0.317   -0.116    0.358
#> 15  x2 ~~  x2     1     1  0.938 0.196  4.796  0.000    0.555    1.321
#> 16  x2 ~~  x3     1     1  0.139 0.131  1.061  0.289   -0.118    0.397
#> 17  x3 ~~  x3     1     1  0.825 0.172  4.796  0.000    0.488    1.162
#> 18  y1 ~1         1     1 -0.295 0.137 -2.148  0.032   -0.564   -0.026
#> 19  y2 ~1         1     1  0.027 0.168  0.163  0.870   -0.302    0.357
#> 20  y3 ~1         1     1  0.233 0.131  1.775  0.076   -0.024    0.490
#> 21  x1 ~1         1     1  0.282 0.132  2.141  0.032    0.024    0.540
#> 22  x2 ~1         1     1 -0.067 0.143 -0.469  0.639   -0.347    0.213
#> 23  x3 ~1         1     1 -0.123 0.134 -0.915  0.360   -0.385    0.140
#> 24  y1  ~  x1     2     2  0.258 0.102  2.530  0.011    0.058    0.458
#> 25  y1  ~  x2     2     2  0.484 0.121  3.998  0.000    0.247    0.721
#> 26  y1  ~  x3     2     2  0.121 0.104  1.165  0.244   -0.082    0.324
#> 27  y2  ~  x1     2     2  0.226 0.127  1.774  0.076   -0.024    0.475
#> 28  y2  ~  x3     2     2  0.261 0.129  2.016  0.044    0.007    0.514
#> 29  y3  ~  y2     2     2 -0.003 0.162 -0.020  0.984   -0.322    0.315
#> 30  y3  ~  x2     2     2  0.291 0.190  1.527  0.127   -0.082    0.664
#> 31  y1 ~~  y1     2     2  0.568 0.109  5.196  0.000    0.354    0.783
#> 32  y2 ~~  y2     2     2  0.882 0.170  5.196  0.000    0.549    1.214
#> 33  y3 ~~  y3     2     2  1.412 0.272  5.196  0.000    0.880    1.945
#> 34  y1 ~~  y3     2     2  0.050 0.122  0.410  0.682   -0.189    0.289
#> 35  x1 ~~  x1     2     2  1.020 0.196  5.196  0.000    0.635    1.405
#> 36  x1 ~~  x2     2     2  0.042 0.117  0.361  0.718   -0.187    0.271
#> 37  x1 ~~  x3     2     2 -0.099 0.137 -0.719  0.472   -0.367    0.170
#> 38  x2 ~~  x2     2     2  0.722 0.139  5.196  0.000    0.450    0.994
#> 39  x2 ~~  x3     2     2  0.013 0.115  0.110  0.912   -0.212    0.238
#> 40  x3 ~~  x3     2     2  0.985 0.190  5.196  0.000    0.613    1.356
#> 41  y1 ~1         2     2  0.007 0.104  0.068  0.946   -0.196    0.211
#> 42  y2 ~1         2     2 -0.050 0.129 -0.392  0.695   -0.303    0.202
#> 43  y3 ~1         2     2 -0.333 0.163 -2.042  0.041   -0.652   -0.013
#> 44  x1 ~1         2     2  0.101 0.137  0.738  0.460   -0.168    0.371
#> 45  x2 ~1         2     2  0.092 0.116  0.797  0.425   -0.134    0.319
#> 46  x3 ~1         2     2 -0.065 0.135 -0.482  0.630   -0.330    0.200

So, these are what semhelpinghands has for now:

Add Significance Test Results: add_sig()

Despite the controversy over null hypothesis significance testing, we still need to report them, for now. They are there, but I have to decode them mentally. Here comes add_sig():

add_sig(est)
#>    lhs op rhs    est sig    se      z pvalue ci.lower ci.upper
#> 1   y1  ~  x1  0.206 *   0.087  2.354  0.019    0.034    0.377
#> 2   y1  ~  x2  0.381 *** 0.093  4.100  0.000    0.199    0.563
#> 3   y1  ~  x3  0.162     0.088  1.852  0.064   -0.009    0.334
#> 4   y2  ~  x1  0.149     0.105  1.425  0.154   -0.056    0.354
#> 5   y2  ~  x3  0.230 *   0.105  2.187  0.029    0.024    0.437
#> 6   y3  ~  y2  0.044     0.106  0.420  0.675   -0.163    0.251
#> 7   y3  ~  x2  0.295 *   0.121  2.445  0.014    0.059    0.532
#> 8   y1 ~~  y1  0.695 *** 0.098  7.071  0.000    0.502    0.888
#> 9   y2 ~~  y2  1.013 *** 0.143  7.071  0.000    0.732    1.294
#> 10  y3 ~~  y3  1.206 *** 0.171  7.071  0.000    0.872    1.540
#> 11  y1 ~~  y3 -0.027     0.092 -0.292  0.770   -0.206    0.153
#> 12  x1 ~~  x1  0.926 *** 0.131  7.071  0.000    0.669    1.183
#> 13  x1 ~~  x2  0.118     0.088  1.339  0.180   -0.055    0.291
#> 14  x1 ~~  x3  0.000     0.092 -0.001  0.999   -0.180    0.180
#> 15  x2 ~~  x2  0.828 *** 0.117  7.071  0.000    0.598    1.057
#> 16  x2 ~~  x3  0.073     0.087  0.840  0.401   -0.098    0.244
#> 17  x3 ~~  x3  0.912 *** 0.129  7.071  0.000    0.659    1.165

If bootstrapping was used, it also supports using the confidence intervals, which may yield results different from the p-values when bootstrapping confidence intervals are used (but same results in this example):

add_sig(est, use = c("pvalue", "ci"))
#>    lhs op rhs    est sig  ci    se      z pvalue ci.lower ci.upper
#> 1   y1  ~  x1  0.206 *   Sig 0.087  2.354  0.019    0.034    0.377
#> 2   y1  ~  x2  0.381 *** Sig 0.093  4.100  0.000    0.199    0.563
#> 3   y1  ~  x3  0.162         0.088  1.852  0.064   -0.009    0.334
#> 4   y2  ~  x1  0.149         0.105  1.425  0.154   -0.056    0.354
#> 5   y2  ~  x3  0.230 *   Sig 0.105  2.187  0.029    0.024    0.437
#> 6   y3  ~  y2  0.044         0.106  0.420  0.675   -0.163    0.251
#> 7   y3  ~  x2  0.295 *   Sig 0.121  2.445  0.014    0.059    0.532
#> 8   y1 ~~  y1  0.695 *** Sig 0.098  7.071  0.000    0.502    0.888
#> 9   y2 ~~  y2  1.013 *** Sig 0.143  7.071  0.000    0.732    1.294
#> 10  y3 ~~  y3  1.206 *** Sig 0.171  7.071  0.000    0.872    1.540
#> 11  y1 ~~  y3 -0.027         0.092 -0.292  0.770   -0.206    0.153
#> 12  x1 ~~  x1  0.926 *** Sig 0.131  7.071  0.000    0.669    1.183
#> 13  x1 ~~  x2  0.118         0.088  1.339  0.180   -0.055    0.291
#> 14  x1 ~~  x3  0.000         0.092 -0.001  0.999   -0.180    0.180
#> 15  x2 ~~  x2  0.828 *** Sig 0.117  7.071  0.000    0.598    1.057
#> 16  x2 ~~  x3  0.073         0.087  0.840  0.401   -0.098    0.244
#> 17  x3 ~~  x3  0.912 *** Sig 0.129  7.071  0.000    0.659    1.165

It also works on the standardized solution:

std <- standardizedSolution(fit)
add_sig(std)
#>    lhs op rhs est.std sig    se      z pvalue ci.lower ci.upper
#> 1   y1  ~  x1   0.208 *   0.087  2.394  0.017    0.038    0.378
#> 2   y1  ~  x2   0.364 *** 0.083  4.364  0.000    0.200    0.527
#> 3   y1  ~  x3   0.163     0.087  1.871  0.061   -0.008    0.333
#> 4   y2  ~  x1   0.138     0.096  1.438  0.150   -0.050    0.326
#> 5   y2  ~  x3   0.212 *   0.095  2.236  0.025    0.026    0.397
#> 6   y3  ~  y2   0.041     0.097  0.420  0.674   -0.149    0.231
#> 7   y3  ~  x2   0.237 *   0.094  2.517  0.012    0.053    0.422
#> 8   y1 ~~  y1   0.767 *** 0.074 10.369  0.000    0.622    0.912
#> 9   y2 ~~  y2   0.936 *** 0.047 19.799  0.000    0.844    1.029
#> 10  y3 ~~  y3   0.941 *** 0.046 20.649  0.000    0.852    1.031
#> 11  y1 ~~  y3  -0.029     0.100 -0.292  0.770   -0.225    0.167
#> 12  x1 ~~  x1   1.000     0.000     NA     NA    1.000    1.000
#> 13  x1 ~~  x2   0.135     0.098  1.377  0.169   -0.057    0.328
#> 14  x1 ~~  x3   0.000     0.100 -0.001  0.999   -0.196    0.196
#> 15  x2 ~~  x2   1.000     0.000     NA     NA    1.000    1.000
#> 16  x2 ~~  x3   0.084     0.099  0.849  0.396   -0.110    0.279
#> 17  x3 ~~  x3   1.000     0.000     NA     NA    1.000    1.000

Note: But be careful about the interpretation of the p-values in the standardized solution, which are based on the delta method. See vignette("standardizedSolution_boot_ci").

See the help page of add_sig() for other options.

Filter by Operators and Some Other Columns: filter_by()

Its purpose is very simple, selecting rows by commonly used columns: operators (op), “dependent variables” (lhs), and “independent variables” (rhs).

filter_by(est, op = "~")
#>   lhs op rhs   est    se     z pvalue ci.lower ci.upper
#> 1  y1  ~  x1 0.206 0.087 2.354  0.019    0.034    0.377
#> 2  y1  ~  x2 0.381 0.093 4.100  0.000    0.199    0.563
#> 3  y1  ~  x3 0.162 0.088 1.852  0.064   -0.009    0.334
#> 4  y2  ~  x1 0.149 0.105 1.425  0.154   -0.056    0.354
#> 5  y2  ~  x3 0.230 0.105 2.187  0.029    0.024    0.437
#> 6  y3  ~  y2 0.044 0.106 0.420  0.675   -0.163    0.251
#> 7  y3  ~  x2 0.295 0.121 2.445  0.014    0.059    0.532

It also supports filtering by group using group labels:

filter_by(est_gp, op = "~", group = "gp1", fit = fit_gp)
#>   lhs op rhs block group   est    se     z pvalue ci.lower ci.upper
#> 1  y1  ~  x1     1     1 0.210 0.149 1.404  0.160   -0.083    0.502
#> 2  y1  ~  x2     1     1 0.243 0.138 1.761  0.078   -0.027    0.513
#> 3  y1  ~  x3     1     1 0.246 0.144 1.710  0.087   -0.036    0.527
#> 4  y2  ~  x1     1     1 0.036 0.179 0.199  0.842   -0.315    0.386
#> 5  y2  ~  x3     1     1 0.217 0.176 1.232  0.218   -0.128    0.561
#> 6  y3  ~  y2     1     1 0.096 0.120 0.802  0.423   -0.139    0.332
#> 7  y3  ~  x2     1     1 0.372 0.135 2.754  0.006    0.107    0.637

See the help page of filter_by() for other options.

Group By DVs or Group By IVs: group_by_dvs() and group_by_ivs()

Sometimes I want the conventional iv-column-dv-row or dv-column-iv-row format. That’s what group_by_dvs() and group_by_ivs() are for:

group_by_dvs(est)
#>    iv est_y1 est_y2 est_y3
#> x1 x1  0.206  0.149     --
#> x2 x2  0.381     --  0.295
#> x3 x3  0.162  0.230     --
#> y2 y2     --     --  0.044
group_by_ivs(est)
#>    dv est_x1 est_x2 est_x3 est_y2
#> y1 y1  0.206  0.381  0.162     --
#> y2 y2  0.149     --  0.230     --
#> y3 y3     --  0.295     --  0.044

They also supports extracting another column:

group_by_dvs(est, col_name = "pvalue")
#>    iv pvalue_y1 pvalue_y2 pvalue_y3
#> x1 x1     0.019     0.154        --
#> x2 x2     0.000        --     0.014
#> x3 x3     0.064     0.029        --
#> y2 y2        --        --     0.675
group_by_ivs(est, col_name = "pvalue")
#>    dv pvalue_x1 pvalue_x2 pvalue_x3 pvalue_y2
#> y1 y1     0.019     0.000     0.064        --
#> y2 y2     0.154        --     0.029        --
#> y3 y3        --     0.014        --     0.675

See the help page of group_by_dvs() and group_by_ivs() for other options.

Group By Groups: group_by_groups()

In multiple sample models, one common task is comparing results across groups. I wrote group_by_groups() for this task, to compare results side-by-side:

group_by_groups(est_gp)
#>    lhs op rhs  est_1  est_2
#> 1   y1  ~  x1  0.210  0.258
#> 2   y1  ~  x2  0.243  0.484
#> 3   y1  ~  x3  0.246  0.121
#> 4   y2  ~  x1  0.036  0.226
#> 5   y2  ~  x3  0.217  0.261
#> 6   y3  ~  x2  0.372  0.291
#> 7   y3  ~  y2  0.096 -0.003
#> 8   x1 ~~  x1  0.798  1.020
#> 9   x1 ~~  x2  0.223  0.042
#> 10  x1 ~~  x3  0.121 -0.099
#> 11  x2 ~~  x2  0.938  0.722
#> 12  x2 ~~  x3  0.139  0.013
#> 13  x3 ~~  x3  0.825  0.985
#> 14  y1 ~~  y1  0.754  0.568
#> 15  y1 ~~  y3  0.010  0.050
#> 16  y2 ~~  y2  1.148  0.882
#> 17  y3 ~~  y3  0.787  1.412
#> 18  x1 ~1      0.282  0.101
#> 19  x2 ~1     -0.067  0.092
#> 20  x3 ~1     -0.123 -0.065
#> 21  y1 ~1     -0.295  0.007
#> 22  y2 ~1      0.027 -0.050
#> 23  y3 ~1      0.233 -0.333

It also supports extracting several columns:

group_by_groups(est_gp,
                col_names = c("est", "pvalue"))
#>    lhs op rhs  est_1  est_2 pvalue_1 pvalue_2
#> 1   y1  ~  x1  0.210  0.258    0.160    0.011
#> 2   y1  ~  x2  0.243  0.484    0.078    0.000
#> 3   y1  ~  x3  0.246  0.121    0.087    0.244
#> 4   y2  ~  x1  0.036  0.226    0.842    0.076
#> 5   y2  ~  x3  0.217  0.261    0.218    0.044
#> 6   y3  ~  x2  0.372  0.291    0.006    0.127
#> 7   y3  ~  y2  0.096 -0.003    0.423    0.984
#> 8   x1 ~~  x1  0.798  1.020    0.000    0.000
#> 9   x1 ~~  x2  0.223  0.042    0.090    0.718
#> 10  x1 ~~  x3  0.121 -0.099    0.317    0.472
#> 11  x2 ~~  x2  0.938  0.722    0.000    0.000
#> 12  x2 ~~  x3  0.139  0.013    0.289    0.912
#> 13  x3 ~~  x3  0.825  0.985    0.000    0.000
#> 14  y1 ~~  y1  0.754  0.568    0.000    0.000
#> 15  y1 ~~  y3  0.010  0.050    0.932    0.682
#> 16  y2 ~~  y2  1.148  0.882    0.000    0.000
#> 17  y3 ~~  y3  0.787  1.412    0.000    0.000
#> 18  x1 ~1      0.282  0.101    0.032    0.460
#> 19  x2 ~1     -0.067  0.092    0.639    0.425
#> 20  x3 ~1     -0.123 -0.065    0.360    0.630
#> 21  y1 ~1     -0.295  0.007    0.032    0.946
#> 22  y2 ~1      0.027 -0.050    0.870    0.695
#> 23  y3 ~1      0.233 -0.333    0.076    0.041

If the fit object is used, it can print group labels:

group_by_groups(fit_gp,
                col_names = c("est", "pvalue"))
#>    lhs op rhs est_gp1 est_gp2 pvalue_gp1 pvalue_gp2
#> 1   y1  ~  x1   0.210   0.258      0.160      0.011
#> 2   y1  ~  x2   0.243   0.484      0.078      0.000
#> 3   y1  ~  x3   0.246   0.121      0.087      0.244
#> 4   y2  ~  x1   0.036   0.226      0.842      0.076
#> 5   y2  ~  x3   0.217   0.261      0.218      0.044
#> 6   y3  ~  x2   0.372   0.291      0.006      0.127
#> 7   y3  ~  y2   0.096  -0.003      0.423      0.984
#> 8   x1 ~~  x1   0.798   1.020      0.000      0.000
#> 9   x1 ~~  x2   0.223   0.042      0.090      0.718
#> 10  x1 ~~  x3   0.121  -0.099      0.317      0.472
#> 11  x2 ~~  x2   0.938   0.722      0.000      0.000
#> 12  x2 ~~  x3   0.139   0.013      0.289      0.912
#> 13  x3 ~~  x3   0.825   0.985      0.000      0.000
#> 14  y1 ~~  y1   0.754   0.568      0.000      0.000
#> 15  y1 ~~  y3   0.010   0.050      0.932      0.682
#> 16  y2 ~~  y2   1.148   0.882      0.000      0.000
#> 17  y3 ~~  y3   0.787   1.412      0.000      0.000
#> 18  x1 ~1       0.282   0.101      0.032      0.460
#> 19  x2 ~1      -0.067   0.092      0.639      0.425
#> 20  x3 ~1      -0.123  -0.065      0.360      0.630
#> 21  y1 ~1      -0.295   0.007      0.032      0.946
#> 22  y2 ~1       0.027  -0.050      0.870      0.695
#> 23  y3 ~1       0.233  -0.333      0.076      0.041

See the help page of group_by_groups() for other options.

Compare Models: group_by_models()

This is inspired by the proposal Rönkkö proposed in a GitHub issue for semTools. I want something simple for a quick overview and so I wrote group_by_models().

Suppose this is the other model fitted:

mod2 <-
"
y1 ~ x1 + x2 + x3
y2 ~ x1 + x2
y3 ~ y2 + x1
"
fit2 <- sem(model = mod2, data = dvs_ivs,
           fixed.x = FALSE)
est2 <- parameterEstimates(fit2)
est2
#>    lhs op rhs    est    se      z pvalue ci.lower ci.upper
#> 1   y1  ~  x1  0.209 0.087  2.394  0.017    0.038    0.381
#> 2   y1  ~  x2  0.387 0.093  4.171  0.000    0.205    0.569
#> 3   y1  ~  x3  0.162 0.088  1.853  0.064   -0.009    0.334
#> 4   y2  ~  x1  0.176 0.106  1.655  0.098   -0.032    0.384
#> 5   y2  ~  x2 -0.209 0.112 -1.864  0.062   -0.430    0.011
#> 6   y3  ~  y2  0.023 0.109  0.210  0.834   -0.190    0.236
#> 7   y3  ~  x1 -0.157 0.117 -1.339  0.181   -0.388    0.073
#> 8   y1 ~~  y1  0.695 0.098  7.071  0.000    0.502    0.888
#> 9   y2 ~~  y2  1.026 0.145  7.071  0.000    0.741    1.310
#> 10  y3 ~~  y3  1.254 0.177  7.071  0.000    0.906    1.601
#> 11  y1 ~~  y3 -0.028 0.093 -0.299  0.765   -0.211    0.155
#> 12  x1 ~~  x1  0.926 0.131  7.071  0.000    0.669    1.183
#> 13  x1 ~~  x2  0.118 0.088  1.339  0.180   -0.055    0.291
#> 14  x1 ~~  x3  0.000 0.092 -0.001  0.999   -0.180    0.180
#> 15  x2 ~~  x2  0.828 0.117  7.071  0.000    0.598    1.057
#> 16  x2 ~~  x3  0.073 0.087  0.840  0.401   -0.098    0.244
#> 17  x3 ~~  x3  0.912 0.129  7.071  0.000    0.659    1.165

These two models have no nested relationships. To compare the estimates, group_by_models() can be used:

group_by_models(list(Model1 = est,
                     Model2 = est2))
#>    lhs op rhs est_Model1 est_Model2
#> 1   y1  ~  x1      0.206      0.209
#> 2   y1  ~  x2      0.381      0.387
#> 3   y1  ~  x3      0.162      0.162
#> 4   y2  ~  x1      0.149      0.176
#> 5   y2  ~  x2         NA     -0.209
#> 6   y2  ~  x3      0.230         NA
#> 7   y3  ~  x1         NA     -0.157
#> 8   y3  ~  x2      0.295         NA
#> 9   y3  ~  y2      0.044      0.023
#> 10  x1 ~~  x1      0.926      0.926
#> 11  x1 ~~  x2      0.118      0.118
#> 12  x1 ~~  x3      0.000      0.000
#> 13  x2 ~~  x2      0.828      0.828
#> 14  x2 ~~  x3      0.073      0.073
#> 15  x3 ~~  x3      0.912      0.912
#> 16  y1 ~~  y1      0.695      0.695
#> 17  y1 ~~  y3     -0.027     -0.028
#> 18  y2 ~~  y2      1.013      1.026
#> 19  y3 ~~  y3      1.206      1.254

It can also compare several columns:

group_by_models(list(Model1 = est,
                     Model2 = est2),
                col_names = c("est", "pvalue"))
#>    lhs op rhs est_Model1 est_Model2 pvalue_Model1 pvalue_Model2
#> 1   y1  ~  x1      0.206      0.209         0.019         0.017
#> 2   y1  ~  x2      0.381      0.387         0.000         0.000
#> 3   y1  ~  x3      0.162      0.162         0.064         0.064
#> 4   y2  ~  x1      0.149      0.176         0.154         0.098
#> 5   y2  ~  x2         NA     -0.209            NA         0.062
#> 6   y2  ~  x3      0.230         NA         0.029            NA
#> 7   y3  ~  x1         NA     -0.157            NA         0.181
#> 8   y3  ~  x2      0.295         NA         0.014            NA
#> 9   y3  ~  y2      0.044      0.023         0.675         0.834
#> 10  x1 ~~  x1      0.926      0.926         0.000         0.000
#> 11  x1 ~~  x2      0.118      0.118         0.180         0.180
#> 12  x1 ~~  x3      0.000      0.000         0.999         0.999
#> 13  x2 ~~  x2      0.828      0.828         0.000         0.000
#> 14  x2 ~~  x3      0.073      0.073         0.401         0.401
#> 15  x3 ~~  x3      0.912      0.912         0.000         0.000
#> 16  y1 ~~  y1      0.695      0.695         0.000         0.000
#> 17  y1 ~~  y3     -0.027     -0.028         0.770         0.765
#> 18  y2 ~~  y2      1.013      1.026         0.000         0.000
#> 19  y3 ~~  y3      1.206      1.254         0.000         0.000

See the help page of group_by_models() for other options.

Sort Rows: sort_by()

The function sort_by() can be used to sort rows using (a) common fields such as "op", "lhs", and "rhs", (b) operators such as "~" and "~~". It can be used on the output of some other functions that manipulate a parameter estimates table.

out <- group_by_groups(est_gp,
                       col_names = c("est", "pvalue"))
out <- filter_by(out, op = c("~", "~~"))
sort_by(out, by = c("op", "rhs"))
#>    lhs op rhs est_1  est_2 pvalue_1 pvalue_2
#> 1   y1  ~  x1 0.210  0.258    0.160    0.011
#> 2   y2  ~  x1 0.036  0.226    0.842    0.076
#> 3   y1  ~  x2 0.243  0.484    0.078    0.000
#> 4   y3  ~  x2 0.372  0.291    0.006    0.127
#> 5   y1  ~  x3 0.246  0.121    0.087    0.244
#> 6   y2  ~  x3 0.217  0.261    0.218    0.044
#> 7   y3  ~  y2 0.096 -0.003    0.423    0.984
#> 8   x1 ~~  x1 0.798  1.020    0.000    0.000
#> 9   x1 ~~  x2 0.223  0.042    0.090    0.718
#> 10  x2 ~~  x2 0.938  0.722    0.000    0.000
#> 11  x1 ~~  x3 0.121 -0.099    0.317    0.472
#> 12  x2 ~~  x3 0.139  0.013    0.289    0.912
#> 13  x3 ~~  x3 0.825  0.985    0.000    0.000
#> 14  y1 ~~  y1 0.754  0.568    0.000    0.000
#> 15  y2 ~~  y2 1.148  0.882    0.000    0.000
#> 16  y1 ~~  y3 0.010  0.050    0.932    0.682
#> 17  y3 ~~  y3 0.787  1.412    0.000    0.000

Some functions, such as group_by_models(), will automatically call sort_by() to sort the results.

The default order should be acceptable in most cases, but can also be customized. See the help page of sort_by() on customizing the order.

Piping

Though not officially supported, piping using |> can be used with most of the functions that manipulate parameter estimates tables. For example:

est_gp |>
  add_sig() |>
  group_by_groups(col_names = c("est", "pvalue", "sig"),
                  group_first = FALSE) |>
  filter_by(op = c("~"))
#>   lhs op rhs est_1 pvalue_1 sig_1  est_2 pvalue_2 sig_2
#> 1  y1  ~  x1 0.210    0.160        0.258    0.011   *  
#> 2  y1  ~  x2 0.243    0.078        0.484    0.000   ***
#> 3  y1  ~  x3 0.246    0.087        0.121    0.244      
#> 4  y2  ~  x1 0.036    0.842        0.226    0.076      
#> 5  y2  ~  x3 0.217    0.218        0.261    0.044   *  
#> 6  y3  ~  x2 0.372    0.006   **   0.291    0.127      
#> 7  y3  ~  y2 0.096    0.423       -0.003    0.984

Compare Methods

Though I believe the choice of the estimation method should be justified, suppose we want to assess the sensitivity of the parameter estimate results to the methods used, compare_estimators() can be used as a quick way to compare results from different methods.

out <- compare_estimators(fit,
         estimator = c("ML", "GLS", "MLR"))
group_by_models(out, col_names = c("se", "pvalue"))
#>    lhs op rhs se_ML se_GLS se_MLR pvalue_ML pvalue_GLS pvalue_MLR
#> 1   y1  ~  x1 0.087  0.094  0.067     0.019      0.028      0.002
#> 2   y1  ~  x2 0.093  0.100  0.091     0.000      0.000      0.000
#> 3   y1  ~  x3 0.088  0.089  0.084     0.064      0.067      0.053
#> 4   y2  ~  x1 0.105  0.112  0.107     0.154      0.148      0.165
#> 5   y2  ~  x3 0.105  0.107  0.123     0.029      0.028      0.061
#> 6   y3  ~  x2 0.121  0.133  0.111     0.014      0.019      0.008
#> 7   y3  ~  y2 0.106  0.116  0.108     0.675      0.654      0.681
#> 8   x1 ~~  x1 0.131  0.129  0.136     0.000      0.000      0.000
#> 9   x1 ~~  x2 0.088  0.090  0.077     0.180      0.202      0.122
#> 10  x1 ~~  x3 0.092  0.092  0.102     0.999      0.840      0.999
#> 11  x2 ~~  x2 0.117  0.114  0.127     0.000      0.000      0.000
#> 12  x2 ~~  x3 0.087  0.089  0.091     0.401      0.414      0.423
#> 13  x3 ~~  x3 0.129  0.131  0.111     0.000      0.000      0.000
#> 14  y1 ~~  y1 0.098  0.100  0.119     0.000      0.000      0.000
#> 15  y1 ~~  y3 0.092  0.093  0.104     0.770      0.793      0.797
#> 16  y2 ~~  y2 0.143  0.139  0.141     0.000      0.000      0.000
#> 17  y3 ~~  y3 0.171  0.167  0.171     0.000      0.000      0.000

It simply refits the models for each estimator and returns the results. They can then be treated as different “models” and processed by group_by_models().

se_ratios() is a wrapper of group_by_models() used to compare the standard errors by different estimators in the output of compare_estimators():

se_ratios(out, reference = "ML")
#>    lhs op rhs se_ML se_GLS se_MLR ratio_ML ratio_GLS ratio_MLR
#> 1   y1  ~  x1 0.087  0.094  0.067        1     1.072     0.765
#> 2   y1  ~  x2 0.093  0.100  0.091        1     1.073     0.977
#> 3   y1  ~  x3 0.088  0.089  0.084        1     1.013     0.958
#> 4   y2  ~  x1 0.105  0.112  0.107        1     1.068     1.027
#> 5   y2  ~  x3 0.105  0.107  0.123        1     1.011     1.165
#> 6   y3  ~  x2 0.121  0.133  0.111        1     1.101     0.918
#> 7   y3  ~  y2 0.106  0.116  0.108        1     1.099     1.020
#> 8   x1 ~~  x1 0.131  0.129  0.136        1     0.985     1.036
#> 9   x1 ~~  x2 0.088  0.090  0.077        1     1.015     0.867
#> 10  x1 ~~  x3 0.092  0.092  0.102        1     0.999     1.114
#> 11  x2 ~~  x2 0.117  0.114  0.127        1     0.974     1.084
#> 12  x2 ~~  x3 0.087  0.089  0.091        1     1.015     1.049
#> 13  x3 ~~  x3 0.129  0.131  0.111        1     1.012     0.859
#> 14  y1 ~~  y1 0.098  0.100  0.119        1     1.015     1.210
#> 15  y1 ~~  y3 0.092  0.093  0.104        1     1.015     1.134
#> 16  y2 ~~  y2 0.143  0.139  0.141        1     0.973     0.987
#> 17  y3 ~~  y3 0.171  0.167  0.171        1     0.979     1.005

See the help page of compare_estimators() for other options.

Bootstrapping

One issue with the standardized solution is the confidence intervals. They are based on the delta method even if se = "boot" is used. For indirect effects, for which bootstrap confidence intervals are commonly used, the confidence intervals for them in the standardized solution are not what usually reported other tools for mediation. There are some other powerful tools on the Internet and the [Google Group for lavaan], see this thread, to address this problem. I wrote standardizedSolution_boot_ci() not to replace them (it obviously can’t), but to address a very specific case I usually encounter myself: Generating the bootstrap confidence intervals for standardized estimates based on the bootstrap estimates already generated by se = "boot".

Please see vignette("standardizedSolution_boot_ci") for an illustration on standardizedSolution_boot_ci().

Others

Showing the Options in a Model

lavaan::lavaan() and its wrappers suc has lavaan::sem() and lavaan::cfa() allow users to set several options using an estimator: ML, GLS, WLSMV, and others. However, it is not easy to remember what the options set for an estimator. Instead of finding them from the output of summary(), this function shows some of them in one table for a quick overview. This is an example:

data(dvs_ivs)
mod <-
"
y1 ~ x1 + x2 + x3
y2 ~ x1 + x3
y3 ~ y2 + x2
"
fit_default <- sem(model = mod, data = dvs_ivs)
show_more_options(fit_default)
#>  Options                             Call    Actual  
#>  Estimator(s)                        default ML      
#>  Standard Error (SE)                 default standard
#>  Model Test Statistic(s)             default standard
#>  How Missing Data is Handled         default listwise
#>  Information Matrix (for SE)         default expected
#>  Information Matrix (for Model Test) default expected
#>  Mean Structure                      default No      
#>  'x' Fixed                           default TRUE
fit_MLR <- sem(model = mod, data = dvs_ivs, estimator = "MLR")
show_more_options(fit_MLR)
#>  Options                             Call    Actual            
#>  Estimator(s)                        MLR     ML                
#>  Standard Error (SE)                 default robust.huber.white
#>  Model Test Statistic(s)             default yuan.bentler.mplus
#>  How Missing Data is Handled         default listwise          
#>  Information Matrix (for SE)         default observed          
#>  Information Matrix (for Model Test) default observed          
#>  Mean Structure                      default No                
#>  'x' Fixed                           default TRUE
fit_MLR_fiml <- sem(model = mod, data = dvs_ivs, estimator = "MLR",
               missing = "fiml")
show_more_options(fit_MLR_fiml)
#>  Options                             Call    Actual            
#>  Estimator(s)                        MLR     ML                
#>  Standard Error (SE)                 default robust.huber.white
#>  Model Test Statistic(s)             default yuan.bentler.mplus
#>  How Missing Data is Handled         fiml    ml                
#>  Information Matrix (for SE)         default observed          
#>  Information Matrix (for Model Test) default observed          
#>  Mean Structure                      default Yes               
#>  'x' Fixed                           default TRUE

Recoding Minimization History

In structural equation modeling, closed-form solution is rare and optimization (minimization) is used to find the/a solution. Out of curiosity and teaching, I wrote a function to capture the minimization history so I can examine it or even plot the process. The function, record_history(), is still in early development but should work for now for common simple scenarios. Please refer the help page of record_history() to learn more about it.

Add Covariances Between “Exogenous” Variables

In lavaan, I rarely need to manually add covariances between exogenous variables (defined in a loose sense: variables appear on the right-hand side but not on the left-hand side of ~). However, I came into a situation in which lavaan will not do this (for good reasons). For example, when a covariance between a residual term and an exogenous variable is set to free. I wrote two simple functions, add_exo_cov() and auto_exo_cov(), for this purpose. Please refer to their help pages for further information.