This tutorial shows how to use `RVenn`

, a package for dealing with multiple sets. The base R functions (`intersect`

, `union`

and `setdiff`

) only work with two sets. `%>%`

can be used from `magrittr`

but, for many sets this can be tedious. `reduce`

function from `purrr`

package also provides a solution, which is the function that is used for set operations in this package. The functions `overlap`

, `unite`

and `discern`

abstract away the details, so one can just construct the universe and choose the sets to operate by index or set name. Further, by using `ggvenn`

Venn diagram can be drawn for 2-3 sets. As you can notice from the name of the function, `ggvenn`

is based on `ggplot2`

, so it is a neat way to show the relationship among a reduced number sets. For many sets, it is much better to use UpSet or `setmap`

function provided within this package. Finally, by using `enrichment_test`

function, the p-value of an overlap between two sets can be calculated. Here, the usage of all these functions will be shown.

This chunk of code will create 10 sets with sizes ranging from 5 to 25.

```
set.seed(42)
toy = map(sample(5:25, replace = TRUE, size = 10),
function(x) sample(letters, size = x))
toy[1:3] # First 3 of the sets.
#> [[1]]
#> [1] "l" "r" "w" "f" "k" "t" "u" "c" "i" "j" "o" "s" "n" "m" "a" "x" "d"
#> [18] "y" "q" "v" "e" "g" "b" "p"
#>
#> [[2]]
#> [1] "a" "u" "z" "e" "t" "m" "h" "i" "x" "q" "g" "o" "y" "s" "l" "p" "d"
#> [18] "j" "n" "f" "r" "v" "c" "k"
#>
#> [[3]]
#> [1] "g" "m" "q" "w" "x" "l" "v" "d" "e" "o" "u"
```

Intersection of all sets:

Intersection of selected sets (chosen with set names or indices, respectively):

```
overlap_pairs(toy, slice = 1:4)
#> $Set_1...Set_2
#> [1] "l" "r" "f" "k" "t" "u" "c" "i" "j" "o" "s" "n" "m" "a" "x" "d" "y"
#> [18] "q" "v" "e" "g" "p"
#>
#> $Set_1...Set_3
#> [1] "l" "w" "u" "o" "m" "x" "d" "q" "v" "e" "g"
#>
#> $Set_1...Set_4
#> [1] "l" "w" "f" "k" "t" "u" "c" "i" "o" "s" "n" "a" "x" "d" "y" "q" "e"
#> [18] "g" "b" "p"
#>
#> $Set_2...Set_3
#> [1] "u" "e" "m" "x" "q" "g" "o" "l" "d" "v"
#>
#> $Set_2...Set_4
#> [1] "a" "u" "z" "e" "t" "h" "i" "x" "q" "g" "o" "y" "s" "l" "p" "d" "n"
#> [18] "f" "c" "k"
#>
#> $Set_3...Set_4
#> [1] "g" "q" "w" "x" "l" "d" "e" "o" "u"
```

Union of all sets:

```
unite(toy)
#> [1] "l" "r" "w" "f" "k" "t" "u" "c" "i" "j" "o" "s" "n" "m" "a" "x" "d"
#> [18] "y" "q" "v" "e" "g" "b" "p" "z" "h"
```

Union of selected sets (chosen with set names or indices, respectively):

```
unite_pairs(toy, slice = 1:4)
#> $Set_1...Set_2
#> [1] "l" "r" "w" "f" "k" "t" "u" "c" "i" "j" "o" "s" "n" "m" "a" "x" "d"
#> [18] "y" "q" "v" "e" "g" "b" "p" "z" "h"
#>
#> $Set_1...Set_3
#> [1] "l" "r" "w" "f" "k" "t" "u" "c" "i" "j" "o" "s" "n" "m" "a" "x" "d"
#> [18] "y" "q" "v" "e" "g" "b" "p"
#>
#> $Set_1...Set_4
#> [1] "l" "r" "w" "f" "k" "t" "u" "c" "i" "j" "o" "s" "n" "m" "a" "x" "d"
#> [18] "y" "q" "v" "e" "g" "b" "p" "z" "h"
#>
#> $Set_2...Set_3
#> [1] "a" "u" "z" "e" "t" "m" "h" "i" "x" "q" "g" "o" "y" "s" "l" "p" "d"
#> [18] "j" "n" "f" "r" "v" "c" "k" "w"
#>
#> $Set_2...Set_4
#> [1] "a" "u" "z" "e" "t" "m" "h" "i" "x" "q" "g" "o" "y" "s" "l" "p" "d"
#> [18] "j" "n" "f" "r" "v" "c" "k" "b" "w"
#>
#> $Set_3...Set_4
#> [1] "g" "m" "q" "w" "x" "l" "v" "d" "e" "o" "u" "b" "k" "a" "z" "i" "s"
#> [18] "c" "h" "t" "f" "n" "p" "y"
```

```
discern_pairs(toy, slice = 1:4)
#> $Set_1...Set_2
#> [1] "w" "b"
#>
#> $Set_1...Set_3
#> [1] "r" "f" "k" "t" "c" "i" "j" "s" "n" "a" "y" "b" "p"
#>
#> $Set_1...Set_4
#> [1] "r" "j" "m" "v"
#>
#> $Set_2...Set_3
#> [1] "a" "z" "t" "h" "i" "y" "s" "p" "j" "n" "f" "r" "c" "k"
#>
#> $Set_2...Set_4
#> [1] "m" "j" "r" "v"
#>
#> $Set_3...Set_4
#> [1] "m" "v"
#>
#> $Set_2...Set_1
#> [1] "z" "h"
#>
#> $Set_3...Set_1
#> character(0)
#>
#> $Set_4...Set_1
#> [1] "z" "h"
#>
#> $Set_3...Set_2
#> [1] "w"
#>
#> $Set_4...Set_2
#> [1] "b" "w"
#>
#> $Set_4...Set_3
#> [1] "b" "k" "a" "z" "i" "s" "c" "h" "t" "f" "n" "p" "y"
```

For two sets:

For three sets:

Without clustering