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In R, how do you test for elements of one vector NOT present in another vector?

X <- c('a','b','c','d')
Y <- c('b', 'e', 'a','d','c','f', 'c')

I want to know whether all the elements of X are present in Y ? (TRUE or FALSE answer)

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  • What is the expected behavior in the case that Carl Witthoft showed in his answer? – talat Dec 5 '14 at 13:03
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You want setdiff:

> setdiff(X, Y) # all elements present in X but not Y
character(0)

> length(setdiff(X, Y)) == 0
[1] TRUE
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  • But see my answer with vsetdiff just in case – Carl Witthoft Dec 5 '14 at 12:53
  • @CarlWitthoft, your answer where? – talat Dec 5 '14 at 12:54
  • @beginneR "Patience, grasshopper" :-) . I posted the comment just prior to posting the answer - should be visible now – Carl Witthoft Dec 5 '14 at 12:57
  • @CarlWitthoft, ok, sorry - I thought you meant an existing answer, perhaps on a different question. Nice answer by the way. We should figure out what the OP wants in such a case. – talat Dec 5 '14 at 13:01
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You can use all and %in% to test if all values of X are also in Y:

all(X %in% Y)
#[1] TRUE
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  • 1
    This is nice, almost like English :-) – Innate Imunity is The Way Dec 5 '14 at 12:48
  • Yes, quite easily understandable, indeed – talat Dec 5 '14 at 12:49
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A warning about setdiff : if your input vectors have repeated elements, setdiff will ignore the duplicates. This may or may not be what you want to do.

I wrote a package vecsets , and here's the difference in what you'll get. Note that I modified X to demonstrate the behavior.

 library(vecsets)
 X <- c('a','b','c','d','d')
 Y <- c('b', 'e', 'a','d','c','f', 'c')
 setdiff(X,Y)
   character(0)
 vsetdiff(X,Y)
[1] "d"
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  • I think it is clear from the OP's question that duplicates do not matter, as he wants know whether "all the elements of X are present in Y". Also, the term set means that duplicates or order do not matter. So you should not use the term "set" in the name of your package/functions, since it will be very confusing. – Innate Imunity is The Way Dec 5 '14 at 13:08
  • @TMS Oddly enough, I interpret "all the elements of X" as meaning each element of the vector, not of the unique elements of the reduced algebraic set. I'll stick with "set" in my function names despite the risk of confusion, since I view it as a companion, rather than a competitor, of algebraic set operations. – Carl Witthoft Dec 5 '14 at 13:11

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