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Parametric, non-parametric, robust, and Bayesian two-sample tests.

Usage

two_sample_test(
  data,
  x,
  y,
  subject.id = NULL,
  type = "parametric",
  paired = FALSE,
  alternative = "two.sided",
  digits = 2L,
  conf.level = 0.95,
  effsize.type = "g",
  var.equal = FALSE,
  bf.prior = 0.707,
  tr = 0.2,
  nboot = 100L,
  ...
)

Arguments

data

A data frame (or a tibble) from which variables specified are to be taken. Other data types (e.g., matrix,table, array, etc.) will not be accepted. Additionally, grouped data frames from {dplyr} should be ungrouped before they are entered as data.

x

The grouping (or independent) variable from data. In case of a repeated measures or within-subjects design, if subject.id argument is not available or not explicitly specified, the function assumes that the data has already been sorted by such an id by the user and creates an internal identifier. So if your data is not sorted, the results can be inaccurate when there are more than two levels in x and there are NAs present. The data is expected to be sorted by user in subject-1,subject-2, ..., pattern.

y

The response (or outcome or dependent) variable from data.

subject.id

Relevant in case of a repeated measures or within-subjects design (paired = TRUE, i.e.), it specifies the subject or repeated measures identifier. Important: Note that if this argument is NULL (which is the default), the function assumes that the data has already been sorted by such an id by the user and creates an internal identifier. So if your data is not sorted and you leave this argument unspecified, the results can be inaccurate when there are more than two levels in x and there are NAs present.

type

A character specifying the type of statistical approach:

  • "parametric"

  • "nonparametric"

  • "robust"

  • "bayes"

You can specify just the initial letter.

paired

Logical that decides whether the experimental design is repeated measures/within-subjects or between-subjects. The default is FALSE.

alternative

a character string specifying the alternative hypothesis, must be one of "two.sided" (default), "greater" or "less". You can specify just the initial letter.

digits

Number of digits for rounding or significant figures. May also be "signif" to return significant figures or "scientific" to return scientific notation. Control the number of digits by adding the value as suffix, e.g. digits = "scientific4" to have scientific notation with 4 decimal places, or digits = "signif5" for 5 significant figures (see also signif()).

conf.level

Scalar between 0 and 1 (default: 95% confidence/credible intervals, 0.95). If NULL, no confidence intervals will be computed.

effsize.type

Type of effect size needed for parametric tests. The argument can be "d" (for Cohen's d) or "g" (for Hedge's g).

var.equal

a logical variable indicating whether to treat the two variances as being equal. If TRUE then the pooled variance is used to estimate the variance otherwise the Welch (or Satterthwaite) approximation to the degrees of freedom is used.

bf.prior

A number between 0.5 and 2 (default 0.707), the prior width to use in calculating Bayes factors and posterior estimates. In addition to numeric arguments, several named values are also recognized: "medium", "wide", and "ultrawide", corresponding to r scale values of 1/2, sqrt(2)/2, and 1, respectively. In case of an ANOVA, this value corresponds to scale for fixed effects.

tr

Trim level for the mean when carrying out robust tests. In case of an error, try reducing the value of tr, which is by default set to 0.2. Lowering the value might help.

nboot

Number of bootstrap samples for computing confidence interval for the effect size (Default: 100L).

...

Currently ignored.

Value

The returned tibble data frame can contain some or all of the following columns (the exact columns will depend on the statistical test):

  • statistic: the numeric value of a statistic

  • df: the numeric value of a parameter being modeled (often degrees of freedom for the test)

  • df.error and df: relevant only if the statistic in question has two degrees of freedom (e.g. anova)

  • p.value: the two-sided p-value associated with the observed statistic

  • method: the name of the inferential statistical test

  • estimate: estimated value of the effect size

  • conf.low: lower bound for the effect size estimate

  • conf.high: upper bound for the effect size estimate

  • conf.level: width of the confidence interval

  • conf.method: method used to compute confidence interval

  • conf.distribution: statistical distribution for the effect

  • effectsize: the name of the effect size

  • n.obs: number of observations

  • expression: pre-formatted expression containing statistical details

For examples, see data frame output vignette.

Two-sample tests

The table below provides summary about:

  • statistical test carried out for inferential statistics

  • type of effect size estimate and a measure of uncertainty for this estimate

  • functions used internally to compute these details

between-subjects

Hypothesis testing

TypeNo. of groupsTestFunction used
Parametric2Student's or Welch's t-teststats::t.test()
Non-parametric2Mann-Whitney U teststats::wilcox.test()
Robust2Yuen's test for trimmed meansWRS2::yuen()
Bayesian2Student's t-testBayesFactor::ttestBF()

Effect size estimation

TypeNo. of groupsEffect sizeCI available?Function used
Parametric2Cohen's d, Hedge's gYeseffectsize::cohens_d(), effectsize::hedges_g()
Non-parametric2r (rank-biserial correlation)Yeseffectsize::rank_biserial()
Robust2Algina-Keselman-Penfield robust standardized differenceYesWRS2::akp.effect()
Bayesian2differenceYesbayestestR::describe_posterior()

within-subjects

Hypothesis testing

TypeNo. of groupsTestFunction used
Parametric2Student's t-teststats::t.test()
Non-parametric2Wilcoxon signed-rank teststats::wilcox.test()
Robust2Yuen's test on trimmed means for dependent samplesWRS2::yuend()
Bayesian2Student's t-testBayesFactor::ttestBF()

Effect size estimation

TypeNo. of groupsEffect sizeCI available?Function used
Parametric2Cohen's d, Hedge's gYeseffectsize::cohens_d(), effectsize::hedges_g()
Non-parametric2r (rank-biserial correlation)Yeseffectsize::rank_biserial()
Robust2Algina-Keselman-Penfield robust standardized differenceYesWRS2::wmcpAKP()
Bayesian2differenceYesbayestestR::describe_posterior()

Examples

# ----------------------- within-subjects -------------------------------------

# data
df <- dplyr::filter(bugs_long, condition %in% c("LDLF", "LDHF"))

# for reproducibility
set.seed(123)

# ----------------------- parametric ---------------------------------------

two_sample_test(df, condition, desire, subject.id = subject, paired = TRUE, type = "parametric")
#> # A tibble: 1 × 16
#>   term   group     statistic df.error       p.value method        alternative
#>   <chr>  <chr>         <dbl>    <dbl>         <dbl> <chr>         <chr>      
#> 1 desire condition      6.65       90 0.00000000222 Paired t-test two.sided  
#>   effectsize estimate conf.level conf.low conf.high conf.method
#>   <chr>         <dbl>      <dbl>    <dbl>     <dbl> <chr>      
#> 1 Hedges' g     0.691       0.95    0.462     0.917 ncp        
#>   conf.distribution n.obs expression
#>   <chr>             <int> <list>    
#> 1 t                    91 <language>

# ----------------------- non-parametric -----------------------------------

two_sample_test(df, condition, desire, subject.id = subject, paired = TRUE, type = "nonparametric")
#> # A tibble: 1 × 14
#>   parameter1 parameter2 statistic      p.value method                   
#>   <chr>      <chr>          <dbl>        <dbl> <chr>                    
#> 1 desire     condition      2250. 0.0000000241 Wilcoxon signed rank test
#>   alternative effectsize        estimate conf.level conf.low conf.high
#>   <chr>       <chr>                <dbl>      <dbl>    <dbl>     <dbl>
#> 1 two.sided   r (rank biserial)    0.761       0.95    0.642     0.844
#>   conf.method n.obs expression
#>   <chr>       <int> <list>    
#> 1 normal         91 <language>

# ----------------------- robust --------------------------------------------

two_sample_test(df, condition, desire, subject.id = subject, paired = TRUE, type = "robust")
#> # A tibble: 1 × 15
#>   statistic df.error      p.value
#>       <dbl>    <dbl>        <dbl>
#> 1      6.46       54 0.0000000313
#>   method                                            
#>   <chr>                                             
#> 1 Yuen's test on trimmed means for dependent samples
#>   effectsize                                              estimate conf.level
#>   <chr>                                                      <dbl>      <dbl>
#> 1 Algina-Keselman-Penfield robust standardized difference    0.533       0.95
#>   conf.low conf.high    mu small medium large n.obs expression
#>      <dbl>     <dbl> <dbl> <dbl>  <dbl> <dbl> <int> <list>    
#> 1    0.369     0.707     0   0.1    0.3   0.5    91 <language>

# ----------------------- Bayesian ---------------------------------------

two_sample_test(df, condition, desire, subject.id = subject, paired = TRUE, type = "bayes")
#> # A tibble: 1 × 16
#>   term       effectsize      estimate conf.level conf.low conf.high    pd
#>   <chr>      <chr>              <dbl>      <dbl>    <dbl>     <dbl> <dbl>
#> 1 Difference Bayesian t-test     1.63       0.95     1.13      2.11     1
#>   prior.distribution prior.location prior.scale     bf10 method         
#>   <chr>                       <dbl>       <dbl>    <dbl> <chr>          
#> 1 cauchy                          0       0.707 4762370. Bayesian t-test
#>   conf.method log_e_bf10 n.obs expression
#>   <chr>            <dbl> <int> <list>    
#> 1 ETI               15.4    91 <language>
# ----------------------- between-subjects -------------------------------------

# for reproducibility
set.seed(123)

# ----------------------- parametric ---------------------------------------

# unequal variance
two_sample_test(ToothGrowth, supp, len, type = "parametric")
#> # A tibble: 1 × 18
#>   parameter1 parameter2 mean.parameter1 mean.parameter2 statistic df.error
#>   <chr>      <chr>                <dbl>           <dbl>     <dbl>    <dbl>
#> 1 len        supp                  20.7            17.0      1.92     55.3
#>   p.value method                  alternative effectsize estimate conf.level
#>     <dbl> <chr>                   <chr>       <chr>         <dbl>      <dbl>
#> 1  0.0606 Welch Two Sample t-test two.sided   Hedges' g     0.488       0.95
#>   conf.low conf.high conf.method conf.distribution n.obs expression
#>      <dbl>     <dbl> <chr>       <chr>             <int> <list>    
#> 1  -0.0217     0.993 ncp         t                    60 <language>

# equal variance
two_sample_test(ToothGrowth, supp, len, type = "parametric", var.equal = TRUE)
#> # A tibble: 1 × 18
#>   parameter1 parameter2 mean.parameter1 mean.parameter2 statistic df.error
#>   <chr>      <chr>                <dbl>           <dbl>     <dbl>    <dbl>
#> 1 len        supp                  20.7            17.0      1.92       58
#>   p.value method            alternative effectsize estimate conf.level conf.low
#>     <dbl> <chr>             <chr>       <chr>         <dbl>      <dbl>    <dbl>
#> 1  0.0604 Two Sample t-test two.sided   Hedges' g     0.488       0.95  -0.0217
#>   conf.high conf.method conf.distribution n.obs expression
#>       <dbl> <chr>       <chr>             <int> <list>    
#> 1     0.993 ncp         t                    60 <language>

# ----------------------- non-parametric -----------------------------------

two_sample_test(ToothGrowth, supp, len, type = "nonparametric")
#> # A tibble: 1 × 14
#>   parameter1 parameter2 statistic p.value method                 alternative
#>   <chr>      <chr>          <dbl>   <dbl> <chr>                  <chr>      
#> 1 len        supp            576.  0.0645 Wilcoxon rank sum test two.sided  
#>   effectsize        estimate conf.level conf.low conf.high conf.method n.obs
#>   <chr>                <dbl>      <dbl>    <dbl>     <dbl> <chr>       <int>
#> 1 r (rank biserial)    0.279       0.95 -0.00812     0.523 normal         60
#>   expression
#>   <list>    
#> 1 <language>

# ----------------------- robust --------------------------------------------

two_sample_test(ToothGrowth, supp, len, type = "robust")
#> # A tibble: 1 × 11
#>   statistic df.error p.value
#>       <dbl>    <dbl>   <dbl>
#> 1      2.29     33.5  0.0286
#>   method                                              
#>   <chr>                                               
#> 1 Yuen's test on trimmed means for independent samples
#>   effectsize                                              estimate conf.level
#>   <chr>                                                      <dbl>      <dbl>
#> 1 Algina-Keselman-Penfield robust standardized difference    0.683       0.95
#>   conf.low conf.high n.obs expression
#>      <dbl>     <dbl> <int> <list>    
#> 1 -0.00736      2.36    60 <language>

# ----------------------- Bayesian ---------------------------------------

two_sample_test(ToothGrowth, supp, len, type = "bayes")
#> # A tibble: 1 × 16
#>   term       effectsize      estimate conf.level conf.low conf.high    pd
#>   <chr>      <chr>              <dbl>      <dbl>    <dbl>     <dbl> <dbl>
#> 1 Difference Bayesian t-test     3.16       0.95   -0.338      6.78 0.961
#>   prior.distribution prior.location prior.scale  bf10 method         
#>   <chr>                       <dbl>       <dbl> <dbl> <chr>          
#> 1 cauchy                          0       0.707  1.20 Bayesian t-test
#>   conf.method log_e_bf10 n.obs expression
#>   <chr>            <dbl> <int> <list>    
#> 1 ETI              0.181    60 <language>