Multiple comparison test

returns
a matrix `c`

= multcompare(`stats`

)`c`

of the pairwise comparison results
from a multiple comparison test using the information contained in
the `stats`

structure. `multcompare`

also
displays an interactive graph of the estimates and comparison intervals.
Each group mean is represented by a symbol, and the interval is represented
by a line extending out from the symbol. Two group means are significantly
different if their intervals are disjoint; they are not significantly
different if their intervals overlap. If you use your mouse to select
any group, then the graph will highlight all other groups that are
significantly different, if any.

returns
a matrix of pairwise comparison results, `c`

= multcompare(`stats`

,`Name,Value`

)`c`

, using
additional options specified by one or more `Name,Value`

pair
arguments. For example, you can specify the confidence interval, or
the type of critical value to use in the multiple comparison.

Load the sample data.

`load carsmall`

Perform a one-way analysis of variance (ANOVA) to see if there is any difference between the mileage of the cars by origin.

`[p,t,stats] = anova1(MPG,Origin,'off');`

Perform a multiple comparison of the group means.

[c,m,h,nms] = multcompare(stats);

`multcompare`

displays the estimates with comparison intervals around them. You can click the graphs of each country to compare its mean to those of other countries.

Now display the mean estimates and the standard errors with the corresponding group names.

[nms num2cell(m)]

`ans=`*6×3 cell*
{'USA' } {[21.1328]} {[0.8814]}
{'Japan' } {[31.8000]} {[1.8206]}
{'Germany'} {[28.4444]} {[2.3504]}
{'France' } {[23.6667]} {[4.0711]}
{'Sweden' } {[22.5000]} {[4.9860]}
{'Italy' } {[ 28]} {[7.0513]}

Load the sample data.

```
load popcorn
popcorn
```

`popcorn = `*6×3*
5.5000 4.5000 3.5000
5.5000 4.5000 4.0000
6.0000 4.0000 3.0000
6.5000 5.0000 4.0000
7.0000 5.5000 5.0000
7.0000 5.0000 4.5000

The data is from a study of popcorn brands and popper types (Hogg 1987). The columns of the matrix `popcorn`

are brands (Gourmet, National, and Generic). The rows are popper types oil and air. In the study, researchers popped a batch of each brand three times with each popper. The values are the yield in cups of popped popcorn.

Perform a two-way ANOVA. Also compute the statistics that you need to perform a multiple comparison test on the main effects.

`[~,~,stats] = anova2(popcorn,3,'off')`

`stats = `*struct with fields:*
source: 'anova2'
sigmasq: 0.1389
colmeans: [6.2500 4.7500 4]
coln: 6
rowmeans: [4.5000 5.5000]
rown: 9
inter: 1
pval: 0.7462
df: 12

The `stats`

structure includes

The mean squared error (

`sigmasq`

)The estimates of the mean yield for each popcorn brand (

`colmeans`

)The number of observations for each popcorn brand (

`coln`

)The estimate of the mean yield for each popper type (

`rowmeans`

)The number of observations for each popper type (

`rown`

)The number of interactions (

`inter`

)The

*p*-value that shows the significance level of the interaction term (`pval`

)The error degrees of freedom (

`df`

).

Perform a multiple comparison test to see if the popcorn yield differs between pairs of popcorn brands (columns).

c = multcompare(stats)

Note: Your model includes an interaction term. A test of main effects can be difficult to interpret when the model includes interactions.

`c = `*3×6*
1.0000 2.0000 0.9260 1.5000 2.0740 0.0000
1.0000 3.0000 1.6760 2.2500 2.8240 0.0000
2.0000 3.0000 0.1760 0.7500 1.3240 0.0116

The first two columns of `c`

show the groups that are compared. The fourth column shows the difference between the estimated group means. The third and fifth columns show the lower and upper limits for 95% confidence intervals for the true mean difference. The sixth column contains the *p*-value for a hypothesis test that the corresponding mean difference is equal to zero. All *p*-values (0, 0, and 0.0116) are very small, which indicates that the popcorn yield differs across all three brands.

The figure shows the multiple comparison of the means. By default, the group 1 mean is highlighted and the comparison interval is in blue. Because the comparison intervals for the other two groups do not intersect with the intervals for the group 1 mean, they are highlighted in red. This lack of intersection indicates that both means are different than group 1 mean. Select other group means to confirm that all group means are significantly different from each other.

Perform a multiple comparison test to see the popcorn yield differs between the two popper types (rows).

c = multcompare(stats,'Estimate','row')

Note: Your model includes an interaction term. A test of main effects can be difficult to interpret when the model includes interactions.

`c = `*1×6*
1.0000 2.0000 -1.3828 -1.0000 -0.6172 0.0001

The small *p*-value of 0.0001 indicates that the popcorn yield differs between the two popper types (air and oil). The figure shows the same results. The disjoint comparison intervals indicate that the group means are significantly different from each other.

Load the sample data.

y = [52.7 57.5 45.9 44.5 53.0 57.0 45.9 44.0]'; g1 = [1 2 1 2 1 2 1 2]; g2 = {'hi';'hi';'lo';'lo';'hi';'hi';'lo';'lo'}; g3 = {'may';'may';'may';'may';'june';'june';'june';'june'};

`y`

is the response vector and `g1`

, `g2`

, and `g3`

are the grouping variables (factors). Each factor has two levels, and every observation in `y`

is identified by a combination of factor levels. For example, observation `y(1)`

is associated with level 1 of factor `g1`

, level `'hi'`

of factor `g2`

, and level `'may'`

of factor `g3`

. Similarly, observation `y(6)`

is associated with level 2 of factor `g1`

, level `'hi'`

of factor `g2`

, and level `'june'`

of factor `g3`

.

Test if the response is the same for all factor levels. Also compute the statistics required for multiple comparison tests.

[~,~,stats] = anovan(y,{g1 g2 g3},'model','interaction',... 'varnames',{'g1','g2','g3'});

The *p*-value of 0.2578 indicates that the mean responses for levels `'may'`

and `'june'`

of factor `g3`

are not significantly different. The *p*-value of 0.0347 indicates that the mean responses for levels `1`

and `2`

of factor `g1`

are significantly different. Similarly, the *p*-value of 0.0048 indicates that the mean responses for levels `'hi'`

and `'lo'`

of factor `g2`

are significantly different.

Perform multiple comparison tests to find out which groups of the factors `g1`

and `g2`

are significantly different.

`results = multcompare(stats,'Dimension',[1 2])`

`results = `*6×6*
1.0000 2.0000 -6.8604 -4.4000 -1.9396 0.0280
1.0000 3.0000 4.4896 6.9500 9.4104 0.0177
1.0000 4.0000 6.1396 8.6000 11.0604 0.0143
2.0000 3.0000 8.8896 11.3500 13.8104 0.0108
2.0000 4.0000 10.5396 13.0000 15.4604 0.0095
3.0000 4.0000 -0.8104 1.6500 4.1104 0.0745

`multcompare`

compares the combinations of groups (levels) of the two grouping variables, `g1`

and `g2`

. In the `results`

matrix, the number 1 corresponds to the combination of level `1`

of `g1`

and level `hi`

of `g2`

, the number 2 corresponds to the combination of level `2`

of `g1`

and level `hi`

of `g2`

. Similarly, the number 3 corresponds to the combination of level `1`

of `g1`

and level `lo`

of `g2`

, and the number 4 corresponds to the combination of level `2`

of `g1`

and level `lo`

of `g2`

. The last column of the matrix contains the *p*-values.

For example, the first row of the matrix shows that the combination of level `1`

of `g1`

and level `hi`

of `g2`

has the same mean response values as the combination of level `2`

of `g1`

and level `hi`

of `g2`

. The *p*-value corresponding to this test is 0.0280, which indicates that the mean responses are significantly different. You can also see this result in the figure. The blue bar shows the comparison interval for the mean response for the combination of level `1`

of `g1`

and level `hi`

of `g2`

. The red bars are the comparison intervals for the mean response for other group combinations. None of the red bars overlap with the blue bar, which means the mean response for the combination of level `1`

of `g1`

and level `hi`

of `g2`

is significantly different from the mean response for other group combinations.

You can test the other groups by clicking on the corresponding comparison interval for the group. The bar you click on turns to blue. The bars for the groups that are significantly different are red. The bars for the groups that are not significantly different are gray. For example, if you click on the comparison interval for the combination of level `1`

of `g1`

and level `lo`

of `g2`

, the comparison interval for the combination of level `2`

of `g1`

and level `lo`

of `g2`

overlaps, and is therefore gray. Conversely, the other comparison intervals are red, indicating significant difference.

`stats`

— Test datastructure

Test data, specified as a structure. You can create a structure using one of the following functions:

`multcompare`

does not support multiple comparisons
using `anovan`

output for a model that includes
random or nested effects. The calculations for a random effects model
produce a warning that all effects are treated as fixed. Nested models
are not accepted.

**Data Types: **`struct`

Specify optional
comma-separated pairs of `Name,Value`

arguments. `Name`

is
the argument name and `Value`

is the corresponding value.
`Name`

must appear inside quotes. You can specify several name and value
pair arguments in any order as
`Name1,Value1,...,NameN,ValueN`

.

`'Alpha',0.01,'CType','bonferroni','Display','off'`

computes
the Bonferroni critical values, conducts the hypothesis tests at the
1% significance level, and omits the interactive display.`'Alpha'`

— Significance level`0.05`

(default) | scalar value in the range (0,1)Significance level of the multiple comparison test, specified
as the comma-separated pair consisting of `'Alpha'`

and
a scalar value in the range (0,1). The value specified for `'Alpha'`

determines
the 100 × (1 – α) confidence
levels of the intervals returned in the matrix `c`

and
in the figure.

**Example: **`'Alpha',0.01`

**Data Types: **`single`

| `double`

`'CType'`

— Type of critical value`'tukey-kramer'`

(default) | `'hsd'`

| `'lsd'`

| `'bonferroni'`

| `'dunn-sidak'`

| `'scheffe'`

Type of critical value to use for the multiple comparison, specified
as the comma-separated pair consisting of `'CType'`

and
one of the following.

Value | Description |
---|---|

`'tukey-kramer'` or `'hsd'` | |

`'bonferroni'` | |

`'dunn-sidak'` | |

`'lsd'` | |

`'scheffe'` |

**Example: **`'CType','bonferroni'`

`'Display'`

— Display toggle`'on'`

(default) | `'off'`

Display toggle, specified as the comma-separated pair consisting
of `'Display'`

and either `'on'`

or `'off'`

.
If you specify `'on'`

, then `multcompare`

displays
a graph of the estimates and their comparison intervals. If you specify `'off'`

,
then `multcompare`

omits the graph.

**Example: **`'Display','off'`

`'Dimension'`

— Dimension over which to calculate marginal means`1`

(default) | positive integer value | vector of positive integer valuesA vector specifying the dimension or dimensions over which to
calculate the population marginal means, specified as a positive integer
value, or a vector of such values. Use the `'Dimension'`

name-value
pair only if you create the input structure `stats`

using
the function `anovan`

.

For example, if you specify `'Dimension'`

as `1`

,
then `multcompare`

compares the means for each
value of the first grouping variable, adjusted by removing effects
of the other grouping variables as if the design were balanced. If
you specify `'Dimension'`

as `[1,3]`

,
then `multcompare`

computes the population marginal
means for each combination of the first and third grouping variables,
removing effects of the second grouping variable. If you fit a singular
model, some cell means may not be estimable and any population marginal
means that depend on those cell means will have the value `NaN`

.

Population marginal means are described by Milliken and Johnson
(1992) and by Searle, Speed, and Milliken (1980). The idea behind
population marginal means is to remove any effect of an unbalanced
design by fixing the values of the factors specified by `'Dimension'`

,
and averaging out the effects of other factors as if each factor combination
occurred the same number of times. The definition of population marginal
means does not depend on the number of observations at each factor
combination. For designed experiments where the number of observations
at each factor combination has no meaning, population marginal means
can be easier to interpret than simple means ignoring other factors.
For surveys and other studies where the number of observations at
each combination does have meaning, population marginal means may
be harder to interpret.

**Example: **`'Dimension',[1,3]`

**Data Types: **`single`

| `double`

`'Estimate'`

— Estimates to be compared`'column'`

(default) | `'row'`

| `'slope'`

| `'intercept'`

| `'pmm'`

Estimates to be compared, specified as the comma-separated pair
consisting of `'Estimate'`

and an allowable value.
The allowable values for `'Estimate'`

depend on the
function used to generate the input structure `stats`

,
according to the following table.

Source | Values |
---|---|

`anova1` | None. This name-value pair is ignored, and |

`anova2` | Either |

`anovan` | None. This name-value pair is ignored, and |

`aoctool` | Either |

`friedman` | None. This name-value pair is ignored, and |

`kruskalwallis` | None. This name-value pair is ignored, and |

**Example: **`'Estimate','row'`

`c`

— Matrix of multiple comparison resultsmatrix of scalar values

Matrix of multiple comparison results, returned as an *p*-by-6
matrix of scalar values, where *p* is the number
of pairs of groups. Each row of the matrix contains the result of
one paired comparison test. Columns 1 and 2 contain the indices of
the two samples being compared. Column 3 contains the lower confidence
interval, column 4 contains the estimate, and column 5 contains the
upper confidence interval. Column 6 contains the *p*-value
for the hypothesis test that the corresponding mean difference is
not equal to 0.

For example, suppose one row contains the following entries.

2.0000 5.0000 1.9442 8.2206 14.4971 0.0432

These numbers indicate that the mean of group 2 minus the mean
of group 5 is estimated to be 8.2206, and a 95% confidence interval
for the true difference of the means is [1.9442, 14.4971]. The *p*-value
for the corresponding hypothesis test that the difference of the means
of groups 2 and 5 is significantly different from zero is 0.0432.

In this example the confidence interval does not contain 0,
so the difference is significant at the 5% significance level. If
the confidence interval did contain 0, the difference would not be
significant. The *p*-value of 0.0432 also indicates
that the difference of the means of groups 2 and 5 is significantly
different from 0.

`m`

— Matrix of estimatesmatrix of scalar values

Matrix of the estimates, returned as a matrix of scalar values.
The first column of `m`

contains the estimated values
of the means (or whatever statistics are being compared) for each
group, and the second column contains their standard errors.

`h`

— Handle to the figurehandle

Handle to the figure containing the interactive graph, returned
as a handle. The title of this graph contains instructions for interacting
with the graph, and the *x*-axis label contains information
about which means are significantly different from the selected mean.
If you plan to use this graph for presentation, you may want to omit
the title and the *x*-axis label. You can remove
them using interactive features of the graph window, or you can use
the following commands.

title('') xlabel('')

`gnames`

— Group namescell array of character vectors

Group names, returned as a cell array of character vectors.
Each row of `gnames`

contains the name of a group.

Analysis of variance compares the means of
several groups to test the hypothesis that they are all equal, against
the general alternative that they are not all equal. Sometimes this
alternative may be too general. You may need information about which
pairs of means are significantly different, and which are not. A *multiple
comparison test* can provide this information.

When you perform a simple *t*-test of one group
mean against another, you specify a significance level that determines
the cutoff value of the *t*-statistic. For example,
you can specify the value `alpha`

= `0.05`

to insure that when there is no
real difference, you will incorrectly find a significant difference
no more than 5% of the time. When there are many group means, there
are also many pairs to compare. If you applied an ordinary *t*-test
in this situation, the `alpha`

value would apply
to each comparison, so the chance of incorrectly finding a significant
difference would increase with the number of comparisons. Multiple
comparison procedures are designed to provide an upper bound on the
probability that *any* comparison will be incorrectly
found significant.

[1] Hochberg, Y., and A. C. Tamhane. *Multiple
Comparison Procedures*. Hoboken, NJ: John Wiley & Sons,
1987.

[2] Milliken, G. A., and D. E. Johnson. *Analysis
of Messy Data, Volume I: Designed Experiments*. Boca Raton,
FL: Chapman & Hall/CRC Press, 1992.

[3] Searle, S. R., F. M. Speed, and G. A.
Milliken. “Population marginal means in the linear model:
an alternative to least-squares means.” *American
Statistician*. 1980, pp. 216–221.

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