The data sets used below are included in the sprtt
package. Thus, the data sets are available when the package is
loaded.
In the R code sections:
# comment: is a commentfunction(): is R code#> results of function(): is console outputThe sprtt package is a sequential
probability ratio
tests toolbox
(sprtt). This vignette demonstrates the usage of the
package using the seq_ttest() function and all arguments
with short examples. The theoretical background of the sequential
t-test will not be covered by this vignette.
The seq_ttest() function has arguments to specify the
requested sequential t-test. The table below shows all possible
combinations which can be performed with the package.
| Two-sample test | One-sample test | |
|---|---|---|
| Two-sided | x | x |
| One-sided | x | x |
| Paired (repeated measures) | x |
Other recommended vignettes cover:
the theoretical background and
an extended use case.
Prior to using the sprtt package it must be installed
and loaded. The latest release version of the package can either be
installed from CRAN or in the latest development version from GitHub.
More information for the installation can be found here.
The sprtt package contains:
seq_ttest() : a function which performs sequential
t-tests
df_income: a set of data to run the examples given
in this vignette
df_stress: a set of data to run the examples given
in this vignette
df_cancer: a set of data to run the examples given
in this vignette
The seq_ttest() function works similarly to the
t.test() function from the stats package if
one is familiar with that already.
Sequential t-tests require some specification from the user:
the variables, which contain the data,
the error probability alpha,
the power (1 - đť›˝),
the effect size Cohen`s d, which represents the
expected effect size or the lowest effect size of interest, and
optional arguments to further specify the test.
However, in some cases, it is not necessary to specify all arguments because some of them have default values. If these values are the ones required, they can be skipped.
| Argument | Default value | Input option |
|---|---|---|
| x | - | formula or numeric input |
| y | NULL | numeric vector |
| data | NULL | data frame |
| mu | 0 | numeric value |
| d | - | numeric value |
| alpha | 0.05 | numeric value between 0 and 1 |
| power | 0.95 | numeric value between 0 and 1 |
| alternative | “two.sided” | “two.sided”, “greater”, “less” |
| paired | FALSE | TRUE or FALSE |
| na.rm | TRUE | TRUE or FALSE |
| verbose | TRUE | TRUE or FALSE |
There are two different ways how the data can be transferred into the
function. The x argument takes either formula
or numeric input. Which input option is recommended depends
on the structure of the data.
The formula input is used when both groups are merged in
one variable and there is a second variable that indicates group
membership. This input option uses the x argument and the
data argument if the variables are stored in a data
frame.
# show data frame --------------------------------------------------------------
head(df_income)
#> monthly_income sex
#> 1 4091.001 female
#> 2 3274.591 male
#> 3 2696.436 female
#> 4 3826.413 male
#> 5 3522.478 female
#> 6 2563.597 male
# sequential t-test: data argument ---------------------------------------------
seq_ttest(monthly_income ~ sex, # x argument
data = df_income,
d = 0.2)
#>
#> ***** Sequential Two Sample t-test *****
#>
#> formula: monthly_income ~ sex
#> test statistic:
#> log-likelihood ratio = -0.594, decision = continue sampling
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
#> Log-Likelihood of the:
#> alternative hypothesis = 0.827
#> null hypothesis = 1.421
#> alternative hypothesis: true difference in means is not equal to 0.
#> specified effect size: Cohen's d = 0.2
#> degrees of freedom: df = 118
#> sample estimates:
#> mean of x mean of y
#> 3072.086 3080.715
#> *Note: to get access to the object of the results use the @ or [] instead of the $ operator.To perform a one-sample test, the right side of the formula has to be
1. The mu argument is also required, which specifies the
mean value that one wants to test against.
# show data frame --------------------------------------------------------------
head(df_income)
#> monthly_income sex
#> 1 4091.001 female
#> 2 3274.591 male
#> 3 2696.436 female
#> 4 3826.413 male
#> 5 3522.478 female
#> 6 2563.597 male
# sequential t-test: data argument ---------------------------------------------
seq_ttest(monthly_income ~ 1, # x argument
mu = 3000,
d = 0.5,
data = df_income)
#>
#> ***** Sequential One Sample t-test *****
#>
#> formula: monthly_income ~ 1
#> test statistic:
#> log-likelihood ratio = -6.288, decision = accept H0
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
#> Log-Likelihood of the:
#> alternative hypothesis = -9.182
#> null hypothesis = -2.894
#> alternative hypothesis: true mean is not equal to 3000.
#> specified effect size: Cohen's d = 0.5
#> degrees of freedom: df = 119
#> sample estimates:
#> mean of x
#> 3076.4
#> *Note: to get access to the object of the results use the @ or [] instead of the $ operator.The numeric input is used when each group has its own
variable. The variables can either be put in the global environment
directly or be stored in a data frame.
If one wants to perform a two-sample test, the y
argument is required in addition to x. If the data are
stored in a data frame, the $ operator is essential to get
access to the variables.
# show data frame --------------------------------------------------------------
head(df_cancer)
#> treatment_group control_group
#> 1 6.097665 4.493064
#> 2 6.609234 5.520956
#> 3 5.665810 3.954091
#> 4 4.830564 3.733212
#> 5 4.917361 4.109373
#> 6 3.457433 3.563800
# sequential t-test: $ operator ------------------------------------------------
seq_ttest(df_cancer$treatment_group, # x argument
df_cancer$control_group, # y argument
d = 0.3,
verbose = FALSE)
#>
#> ***** Sequential Two Sample t-test *****
#>
#> formula: df_cancer$treatment_group and df_cancer$control_group
#> test statistic:
#> log-likelihood ratio = 10.777, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
# sequential t-test: global variables ------------------------------------------
treatment <- df_cancer$treatment_group
control <- df_cancer$control_group
seq_ttest(treatment,
control,
d = 0.3,
verbose = FALSE)
#>
#> ***** Sequential Two Sample t-test *****
#>
#> formula: treatment and control
#> test statistic:
#> log-likelihood ratio = 10.777, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944If one wants to perform a one-sample test there is only one group and
therefore only one variable. If the data are in a data frame, the
$ operator is essential to get access to the variables. The
mu argument is additionally required, which specifies the
mean which one wants to test against.
# show data frame --------------------------------------------------------------
head(df_cancer)
#> treatment_group control_group
#> 1 6.097665 4.493064
#> 2 6.609234 5.520956
#> 3 5.665810 3.954091
#> 4 4.830564 3.733212
#> 5 4.917361 4.109373
#> 6 3.457433 3.563800
# sequential t-test: $ operator ------------------------------------------------
seq_ttest(df_cancer$treatment_group, # x argument
mu = 3.5,
d = 0.2,
verbose = FALSE)
#>
#> ***** Sequential One Sample t-test *****
#>
#> formula: df_cancer$treatment_group
#> test statistic:
#> log-likelihood ratio = 16.677, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
# sequential t-test: global variables ------------------------------------------
treatment <- df_cancer$treatment_group
seq_ttest(treatment, # x argument
mu = 3.5,
data = df,
d = 0.2,
verbose = FALSE)
#>
#> ***** Sequential One Sample t-test *****
#>
#> formula: treatment
#> test statistic:
#> log-likelihood ratio = 16.677, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944The paired argument states if the data are paired. To
perform a paired sequential t-test, paired has to
be set to TRUE.
# show data frame --------------------------------------------------------------
head(df_stress)
#> baseline_stress one_year_stress
#> 1 7.175250 7.844337
#> 2 4.918343 5.527191
#> 3 4.634266 5.783046
#> 4 5.671340 7.793956
#> 5 4.141257 3.133889
#> 6 4.771696 8.548586
# sequential t-test: $ operator ------------------------------------------------
seq_ttest(df_stress$baseline_stress, # x argument
df_stress$one_year_stress, # y argument
d = 0.3,
paired = TRUE,
data = df_stress)
#>
#> ***** Sequential Paired t-test *****
#>
#> formula: df_stress$baseline_stress and df_stress$one_year_stress
#> test statistic:
#> log-likelihood ratio = 7.174, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
#> Log-Likelihood of the:
#> alternative hypothesis = -3.483
#> null hypothesis = -10.657
#> alternative hypothesis: true difference in means is not equal to 0.
#> specified effect size: Cohen's d = 0.3
#> degrees of freedom: df = 119
#> sample estimates:
#> mean difference
#> -0.39622
#> *Note: to get access to the object of the results use the @ or [] instead of the $ operator.The alternative argument states in which way the test is
to be performed:
two-sided: "two.sided" or
one-sided: "less" or
"greater".
# show data frame --------------------------------------------------------------
head(df_income)
#> monthly_income sex
#> 1 4091.001 female
#> 2 3274.591 male
#> 3 2696.436 female
#> 4 3826.413 male
#> 5 3522.478 female
#> 6 2563.597 male
# sequential t-test: data argument ---------------------------------------------
seq_ttest(monthly_income ~ 1, # x argument
mu = 1000,
d = 0.3,
alternative = "two.sided",
data = df_income)
#>
#> ***** Sequential One Sample t-test *****
#>
#> formula: monthly_income ~ 1
#> test statistic:
#> log-likelihood ratio = 31.548, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
#> Log-Likelihood of the:
#> alternative hypothesis = -149.747
#> null hypothesis = -181.295
#> alternative hypothesis: true mean is not equal to 1000.
#> specified effect size: Cohen's d = 0.3
#> degrees of freedom: df = 119
#> sample estimates:
#> mean of x
#> 3076.4
#> *Note: to get access to the object of the results use the @ or [] instead of the $ operator.The na.rm argument defines the handling of missing
values. If set to TRUE (default value), it will remove all
missing values automatically. If this behavior is not wanted, the
na.rm argument has to be set to FALSE. If
missing values are discovered, an error is triggered.
The verbose argument defines the extent of the output
shown in the console. If set to TRUE (default value), the
output will be elaborate, if set to FALSE the output will
be short.
# sequential t-test: verbose FALSE ---------------------------------------------
seq_ttest(df_cancer$treatment_group, # x argument
df_cancer$control_group, # y argument
d = 0.3,
verbose = FALSE)
#>
#> ***** Sequential Two Sample t-test *****
#>
#> formula: df_cancer$treatment_group and df_cancer$control_group
#> test statistic:
#> log-likelihood ratio = 10.777, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
# sequential t-test: verbose TRUE ----------------------------------------------
seq_ttest(df_cancer$treatment_group, # x argument
df_cancer$control_group, # y argument
d = 0.3,
verbose = TRUE)
#>
#> ***** Sequential Two Sample t-test *****
#>
#> formula: df_cancer$treatment_group and df_cancer$control_group
#> test statistic:
#> log-likelihood ratio = 10.777, decision = accept H1
#> SPRT thresholds:
#> lower log(B) = -2.944, upper log(A) = 2.944
#> Log-Likelihood of the:
#> alternative hypothesis = -11.635
#> null hypothesis = -22.411
#> alternative hypothesis: true difference in means is not equal to 0.
#> specified effect size: Cohen's d = 0.3
#> degrees of freedom: df = 238
#> sample estimates:
#> mean of x mean of y
#> 4.92417 4.02215
#> *Note: to get access to the object of the results use the @ or [] instead of the $ operator.The simplest way to get access to the results is to run the
seq_ttest() function. It will print the results
automatically in the console. The verbose argument specifies how much
information is wished to be shown.
However, the recommended way is to save the results in an object (e.g
“results”). Doing so allows running further calculations with it
afterward. It is important to keep in mind that the output object will
be an S4 class. Therefore the access operator is the @ sign
or the [] brackets.