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a and b are two vectors of real numbers.

They do not necessarily have the same length.

The distance between the ith element of a and the jth element of b is defined as abs(a[i] - b[j])

How would you compute the smallest distance between any element of a and any element of b without explicit loops?

Here is what I did: min(sapply(X=1:length(b), FUN=function(x) abs(a - b[x]))).

However, I have the feeling there is something better to do...

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@Joshua: a counterexample: a = c(9 5 6), b = c(6, 9). Thanks –  user7064 May 30 '13 at 5:13
@JoshuaUlrich the OP wants the minimum distance between any point pair, not the distance between the point pair of the minimums of each vector. –  Paul Hiemstra May 30 '13 at 5:26

3 Answers 3

up vote 3 down vote accepted

Here's an attempt:

a <- c(9,5,6); b <- c(6,9)
# a
#[1] 9 5 6
# b
#[1] 6 9

combos <- sapply(b,function(x) abs(x-a))
# or an alternative
combos <- abs(outer(a,b,FUN="-"))

You could then get the minimum distance with:


If you wanted to get the respective indexes of the minimum values you could do:


# each matrix row has the 2 indexes for the minimums
# first column is 'a' index, second is 'b' index
#      row col
# [1,]   3   1
# [2,]   1   2
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I like the "outer solution" :-) –  user7064 May 30 '13 at 6:17
Than you should probably accept that as your answer, the green tick mark is to show which answer helped you best. –  Paul Hiemstra May 30 '13 at 6:33
@PaulHiemstra: done :-) –  user7064 May 30 '13 at 6:45

I'd use the dist function to create a distance matrix, and then find the minimum distance in that. This is probably much faster than an explicit loop in R (including sapply).

a = runif(23)
b = runif(10)
d_matrix = as.matrix(dist(cbind(a,b)))
d_matrix[d_matrix == 0] <- NA
sqrt(min(d_matrix, na.rm = TRUE))

Note that cbind recycles the smaller vector. So this function is probably not optimal, but for vectors that do not differ that much in size still much fast than an explicit loop.

And to find which pair of elements had this distance (although the recycling introduces some challenges here):

which(d_matrix == min(d_matrix, na.rm = TRUE), arr.ind = TRUE)
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Thanks! I think it does not work when a and b have different lengths. Is it possible to adapt it? –  user7064 May 30 '13 at 5:31
When a and b are not of equal length, cbind will simply repeat the smaller vector. Therefore, min(d_matrix) will still return the minimum. I adapted my example. –  Paul Hiemstra May 30 '13 at 5:39
Ok regarding the length issue. A last thing: when a = c(7, 9, 11) and b = c(5, 13), your code returns 4. Am I missing something? –  user7064 May 30 '13 at 5:50
dist uses the squared distance, taking the square root of the minimum gets you the correct answer. –  Paul Hiemstra May 30 '13 at 6:32
Ah, ok! +1 and thank you!! –  user7064 May 30 '13 at 6:33

One-liner should work here: min(abs(outer(a, b, "-")))

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Very good :-) I accepted @thelatemail's answer which suggests outer first. Anyway, +1 and thank you very much! –  user7064 May 30 '13 at 6:18

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